isabelle: src/HOL/Library/RBT.thy@f4db921165ce (annotated)

26192 52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1	(* Title: RBT.thy
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	2	Author: Markus Reiter, TU Muenchen
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	3	Author: Alexander Krauss, TU Muenchen
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	4	*)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	5
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	6	header {* Red-Black Trees *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	7
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	8	(<)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	9	theory RBT
30738 0842e906300c normalized imports haftmann parents: 30235 diff changeset	10	imports Main AssocList
26192 52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	11	begin
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	12
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	13	datatype color = R \| B
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	14	datatype ('a,'b)"rbt" = Empty \| Tr color "('a,'b)rbt" 'a 'b "('a,'b)rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	15
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	16	(* Suchbaum-Eigenschaften *)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	17
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	18	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	19	pin_tree :: "'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	20	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	21	"pin_tree k v Empty = False"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	22	\| "pin_tree k v (Tr c l x y r) = (k = x \<and> v = y \<or> pin_tree k v l \<or> pin_tree k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	23
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	24	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	25	keys :: "('k,'v) rbt \<Rightarrow> 'k set"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	26	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	27	"keys Empty = {}"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	28	\| "keys (Tr _ l k _ r) = { k } \<union> keys l \<union> keys r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	29
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	30	lemma pint_keys: "pin_tree k v t \<Longrightarrow> k \<in> keys t" by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	31
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	32	primrec tlt :: "'a\<Colon>order \<Rightarrow> ('a,'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	33	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	34	"tlt k Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	35	\| "tlt k (Tr c lt kt v rt) = (kt < k \<and> tlt k lt \<and> tlt k rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	36
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	37	abbreviation tllt (infix "\|\<guillemotleft>" 50)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	38	where "t \|\<guillemotleft> x == tlt x t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	39
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	40	primrec tgt :: "'a\<Colon>order \<Rightarrow> ('a,'b) rbt \<Rightarrow> bool" (infix "\<guillemotleft>\|" 50)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	41	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	42	"tgt k Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	43	\| "tgt k (Tr c lt kt v rt) = (k < kt \<and> tgt k lt \<and> tgt k rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	44
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	45	lemma tlt_prop: "(t \|\<guillemotleft> k) = (\<forall>x\<in>keys t. x < k)" by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	46	lemma tgt_prop: "(k \<guillemotleft>\| t) = (\<forall>x\<in>keys t. k < x)" by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	47	lemmas tlgt_props = tlt_prop tgt_prop
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	48
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	49	lemmas tgt_nit = tgt_prop pint_keys
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	50	lemmas tlt_nit = tlt_prop pint_keys
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	51
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	52	lemma tlt_trans: "\<lbrakk> t \|\<guillemotleft> x; x < y \<rbrakk> \<Longrightarrow> t \|\<guillemotleft> y"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	53	and tgt_trans: "\<lbrakk> x < y; y \<guillemotleft>\| t\<rbrakk> \<Longrightarrow> x \<guillemotleft>\| t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	54	by (auto simp: tlgt_props)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	55
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	56
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	57	primrec st :: "('a::linorder, 'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	58	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	59	"st Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	60	\| "st (Tr c l k v r) = (l \|\<guillemotleft> k \<and> k \<guillemotleft>\| r \<and> st l \<and> st r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	61
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	62	primrec map_of :: "('a\<Colon>linorder, 'b) rbt \<Rightarrow> 'a \<rightharpoonup> 'b"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	63	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	64	"map_of Empty k = None"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	65	\| "map_of (Tr _ l x y r) k = (if k < x then map_of l k else if x < k then map_of r k else Some y)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	66
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	67	lemma map_of_tlt[simp]: "t \|\<guillemotleft> k \<Longrightarrow> map_of t k = None"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	68	by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	69
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	70	lemma map_of_tgt[simp]: "k \<guillemotleft>\| t \<Longrightarrow> map_of t k = None"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	71	by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	72
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	73	lemma mapof_keys: "st t \<Longrightarrow> dom (map_of t) = keys t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	74	by (induct t) (auto simp: dom_def tgt_prop tlt_prop)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	75
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	76	lemma mapof_pit: "st t \<Longrightarrow> (map_of t k = Some v) = pin_tree k v t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	77	by (induct t) (auto simp: tlt_prop tgt_prop pint_keys)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	78
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	79	lemma map_of_Empty: "map_of Empty = empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	80	by (rule ext) simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	81
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	82	(* a kind of extensionality *)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	83	lemma mapof_from_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	84	assumes st: "st t1" "st t2"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	85	and eq: "\<And>v. pin_tree (k\<Colon>'a\<Colon>linorder) v t1 = pin_tree k v t2"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	86	shows "map_of t1 k = map_of t2 k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	87	proof (cases "map_of t1 k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	88	case None
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	89	then have "\<And>v. \<not> pin_tree k v t1"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	90	by (simp add: mapof_pit[symmetric] st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	91	with None show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	92	by (cases "map_of t2 k") (auto simp: mapof_pit st eq)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	93	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	94	case (Some a)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	95	then show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	96	apply (cases "map_of t2 k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	97	apply (auto simp: mapof_pit st eq)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	98	by (auto simp add: mapof_pit[symmetric] st Some)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	99	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	100
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	101	subsection {* Red-black properties *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	102
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	103	primrec treec :: "('a,'b) rbt \<Rightarrow> color"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	104	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	105	"treec Empty = B"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	106	\| "treec (Tr c _ _ _ _) = c"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	107
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	108	primrec inv1 :: "('a,'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	109	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	110	"inv1 Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	111	\| "inv1 (Tr c lt k v rt) = (inv1 lt \<and> inv1 rt \<and> (c = B \<or> treec lt = B \<and> treec rt = B))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	112
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	113	(* Weaker version *)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	114	primrec inv1l :: "('a,'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	115	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	116	"inv1l Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	117	\| "inv1l (Tr c l k v r) = (inv1 l \<and> inv1 r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	118	lemma [simp]: "inv1 t \<Longrightarrow> inv1l t" by (cases t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	119
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	120	primrec bh :: "('a,'b) rbt \<Rightarrow> nat"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	121	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	122	"bh Empty = 0"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	123	\| "bh (Tr c lt k v rt) = (if c = B then Suc (bh lt) else bh lt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	124
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	125	primrec inv2 :: "('a,'b) rbt \<Rightarrow> bool"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	126	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	127	"inv2 Empty = True"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	128	\| "inv2 (Tr c lt k v rt) = (inv2 lt \<and> inv2 rt \<and> bh lt = bh rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	129
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	130	definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	131	"isrbt t = (inv1 t \<and> inv2 t \<and> treec t = B \<and> st t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	132
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	133	lemma isrbt_st[simp]: "isrbt t \<Longrightarrow> st t" by (simp add: isrbt_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	134
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	135	lemma rbt_cases:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	136	obtains (Empty) "t = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	137	\| (Red) l k v r where "t = Tr R l k v r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	138	\| (Black) l k v r where "t = Tr B l k v r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	139	by (cases t, simp) (case_tac "color", auto)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	140
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	141	theorem Empty_isrbt[simp]: "isrbt Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	142	unfolding isrbt_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	143
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	144
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	145	subsection {* Insertion *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	146
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	147	fun (* slow, due to massive case splitting *)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	148	balance :: "('a,'b) rbt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	149	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	150	"balance (Tr R a w x b) s t (Tr R c y z d) = Tr R (Tr B a w x b) s t (Tr B c y z d)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	151	"balance (Tr R (Tr R a w x b) s t c) y z d = Tr R (Tr B a w x b) s t (Tr B c y z d)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	152	"balance (Tr R a w x (Tr R b s t c)) y z d = Tr R (Tr B a w x b) s t (Tr B c y z d)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	153	"balance a w x (Tr R b s t (Tr R c y z d)) = Tr R (Tr B a w x b) s t (Tr B c y z d)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	154	"balance a w x (Tr R (Tr R b s t c) y z d) = Tr R (Tr B a w x b) s t (Tr B c y z d)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	155	"balance a s t b = Tr B a s t b"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	156
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	157	lemma balance_inv1: "\<lbrakk>inv1l l; inv1l r\<rbrakk> \<Longrightarrow> inv1 (balance l k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	158	by (induct l k v r rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	159
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	160	lemma balance_bh: "bh l = bh r \<Longrightarrow> bh (balance l k v r) = Suc (bh l)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	161	by (induct l k v r rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	162
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	163	lemma balance_inv2:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	164	assumes "inv2 l" "inv2 r" "bh l = bh r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	165	shows "inv2 (balance l k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	166	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	167	by (induct l k v r rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	168
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	169	lemma balance_tgt[simp]: "(v \<guillemotleft>\| balance a k x b) = (v \<guillemotleft>\| a \<and> v \<guillemotleft>\| b \<and> v < k)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	170	by (induct a k x b rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	171
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	172	lemma balance_tlt[simp]: "(balance a k x b \|\<guillemotleft> v) = (a \|\<guillemotleft> v \<and> b \|\<guillemotleft> v \<and> k < v)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	173	by (induct a k x b rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	174
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	175	lemma balance_st:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	176	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	177	assumes "st l" "st r" "l \|\<guillemotleft> k" "k \<guillemotleft>\| r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	178	shows "st (balance l k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	179	using assms proof (induct l k v r rule: balance.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	180	case ("2_2" a x w b y t c z s va vb vd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	181	hence "y < z \<and> z \<guillemotleft>\| Tr B va vb vd vc"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	182	by (auto simp add: tlgt_props)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	183	hence "tgt y (Tr B va vb vd vc)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	184	with "2_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	185	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	186	case ("3_2" va vb vd vc x w b y s c z)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	187	from "3_2" have "x < y \<and> tlt x (Tr B va vb vd vc)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	188	by (simp add: tlt.simps tgt.simps)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	189	hence "tlt y (Tr B va vb vd vc)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	190	with "3_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	191	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	192	case ("3_3" x w b y s c z t va vb vd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	193	from "3_3" have "y < z \<and> tgt z (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	194	hence "tgt y (Tr B va vb vd vc)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	195	with "3_3" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	196	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	197	case ("3_4" vd ve vg vf x w b y s c z t va vb vii vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	198	hence "x < y \<and> tlt x (Tr B vd ve vg vf)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	199	hence 1: "tlt y (Tr B vd ve vg vf)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	200	from "3_4" have "y < z \<and> tgt z (Tr B va vb vii vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	201	hence "tgt y (Tr B va vb vii vc)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	202	with 1 "3_4" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	203	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	204	case ("4_2" va vb vd vc x w b y s c z t dd)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	205	hence "x < y \<and> tlt x (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	206	hence "tlt y (Tr B va vb vd vc)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	207	with "4_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	208	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	209	case ("5_2" x w b y s c z t va vb vd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	210	hence "y < z \<and> tgt z (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	211	hence "tgt y (Tr B va vb vd vc)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	212	with "5_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	213	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	214	case ("5_3" va vb vd vc x w b y s c z t)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	215	hence "x < y \<and> tlt x (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	216	hence "tlt y (Tr B va vb vd vc)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	217	with "5_3" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	218	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	219	case ("5_4" va vb vg vc x w b y s c z t vd ve vii vf)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	220	hence "x < y \<and> tlt x (Tr B va vb vg vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	221	hence 1: "tlt y (Tr B va vb vg vc)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	222	from "5_4" have "y < z \<and> tgt z (Tr B vd ve vii vf)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	223	hence "tgt y (Tr B vd ve vii vf)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	224	with 1 "5_4" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	225	qed simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	226
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	227	lemma keys_balance[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	228	"keys (balance l k v r) = { k } \<union> keys l \<union> keys r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	229	by (induct l k v r rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	230
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	231	lemma balance_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	232	"pin_tree k x (balance l v y r) = (pin_tree k x l \<or> k = v \<and> x = y \<or> pin_tree k x r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	233	by (induct l v y r rule: balance.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	234
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	235	lemma map_of_balance[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	236	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	237	assumes "st l" "st r" "l \|\<guillemotleft> k" "k \<guillemotleft>\| r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	238	shows "map_of (balance l k v r) x = map_of (Tr B l k v r) x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	239	by (rule mapof_from_pit) (auto simp:assms balance_pit balance_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	240
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	241	primrec paint :: "color \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	242	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	243	"paint c Empty = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	244	\| "paint c (Tr _ l k v r) = Tr c l k v r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	245
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	246	lemma paint_inv1l[simp]: "inv1l t \<Longrightarrow> inv1l (paint c t)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	247	lemma paint_inv1[simp]: "inv1l t \<Longrightarrow> inv1 (paint B t)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	248	lemma paint_inv2[simp]: "inv2 t \<Longrightarrow> inv2 (paint c t)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	249	lemma paint_treec[simp]: "treec (paint B t) = B" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	250	lemma paint_st[simp]: "st t \<Longrightarrow> st (paint c t)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	251	lemma paint_pit[simp]: "pin_tree k x (paint c t) = pin_tree k x t" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	252	lemma paint_mapof[simp]: "map_of (paint c t) = map_of t" by (rule ext) (cases t, auto)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	253	lemma paint_tgt[simp]: "(v \<guillemotleft>\| paint c t) = (v \<guillemotleft>\| t)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	254	lemma paint_tlt[simp]: "(paint c t \|\<guillemotleft> v) = (t \|\<guillemotleft> v)" by (cases t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	255
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	256	fun
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	257	ins :: "('a\<Colon>linorder \<Rightarrow> 'b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	258	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	259	"ins f k v Empty = Tr R Empty k v Empty" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	260	"ins f k v (Tr B l x y r) = (if k < x then balance (ins f k v l) x y r
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	261	else if k > x then balance l x y (ins f k v r)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	262	else Tr B l x (f k y v) r)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	263	"ins f k v (Tr R l x y r) = (if k < x then Tr R (ins f k v l) x y r
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	264	else if k > x then Tr R l x y (ins f k v r)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	265	else Tr R l x (f k y v) r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	266
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	267	lemma ins_inv1_inv2:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	268	assumes "inv1 t" "inv2 t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	269	shows "inv2 (ins f k x t)" "bh (ins f k x t) = bh t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	270	"treec t = B \<Longrightarrow> inv1 (ins f k x t)" "inv1l (ins f k x t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	271	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	272	by (induct f k x t rule: ins.induct) (auto simp: balance_inv1 balance_inv2 balance_bh)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	273
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	274	lemma ins_tgt[simp]: "(v \<guillemotleft>\| ins f k x t) = (v \<guillemotleft>\| t \<and> k > v)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	275	by (induct f k x t rule: ins.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	276	lemma ins_tlt[simp]: "(ins f k x t \|\<guillemotleft> v) = (t \|\<guillemotleft> v \<and> k < v)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	277	by (induct f k x t rule: ins.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	278	lemma ins_st[simp]: "st t \<Longrightarrow> st (ins f k x t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	279	by (induct f k x t rule: ins.induct) (auto simp: balance_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	280
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	281	lemma keys_ins: "keys (ins f k v t) = { k } \<union> keys t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	282	by (induct f k v t rule: ins.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	283
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	284	lemma map_of_ins:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	285	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	286	assumes "st t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	287	shows "map_of (ins f k v t) x = ((map_of t)(k \|-> case map_of t k of None \<Rightarrow> v
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	288	\| Some w \<Rightarrow> f k w v)) x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	289	using assms by (induct f k v t rule: ins.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	290
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	291	definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	292	insertwithkey :: "('a\<Colon>linorder \<Rightarrow> 'b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	293	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	294	"insertwithkey f k v t = paint B (ins f k v t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	295
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	296	lemma insertwk_st: "st t \<Longrightarrow> st (insertwithkey f k x t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	297	by (auto simp: insertwithkey_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	298
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	299	theorem insertwk_isrbt:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	300	assumes inv: "isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	301	shows "isrbt (insertwithkey f k x t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	302	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	303	unfolding insertwithkey_def isrbt_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	304	by (auto simp: ins_inv1_inv2)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	305
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	306	lemma map_of_insertwk:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	307	assumes "st t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	308	shows "map_of (insertwithkey f k v t) x = ((map_of t)(k \|-> case map_of t k of None \<Rightarrow> v
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	309	\| Some w \<Rightarrow> f k w v)) x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	310	unfolding insertwithkey_def using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	311	by (simp add:map_of_ins)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	312
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	313	definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	314	insertw_def: "insertwith f = insertwithkey (\<lambda>_. f)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	315
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	316	lemma insertw_st: "st t \<Longrightarrow> st (insertwith f k v t)" by (simp add: insertwk_st insertw_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	317	theorem insertw_isrbt: "isrbt t \<Longrightarrow> isrbt (insertwith f k v t)" by (simp add: insertwk_isrbt insertw_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	318
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	319	lemma map_of_insertw:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	320	assumes "isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	321	shows "map_of (insertwith f k v t) = (map_of t)(k \<mapsto> (if k:dom (map_of t) then f (the (map_of t k)) v else v))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	322	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	323	unfolding insertw_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	324	by (rule_tac ext) (cases "map_of t k", auto simp:map_of_insertwk dom_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	325
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	326
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	327	definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	328	"insrt k v t = insertwithkey (\<lambda>_ _ nv. nv) k v t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	329
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	330	lemma insrt_st: "st t \<Longrightarrow> st (insrt k v t)" by (simp add: insertwk_st insrt_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	331	theorem insrt_isrbt: "isrbt t \<Longrightarrow> isrbt (insrt k v t)" by (simp add: insertwk_isrbt insrt_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	332
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	333	lemma map_of_insert:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	334	assumes "isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	335	shows "map_of (insrt k v t) = (map_of t)(k\<mapsto>v)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	336	unfolding insrt_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	337	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	338	by (rule_tac ext) (simp add: map_of_insertwk split:option.split)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	339
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	340
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	341	subsection {* Deletion *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	342
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	343	(*definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	344	[simp]: "ibn t = (bh t > 0 \<and> treec t = B)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	345	*)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	346	lemma bh_paintR'[simp]: "treec t = B \<Longrightarrow> bh (paint R t) = bh t - 1"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	347	by (cases t rule: rbt_cases) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	348
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	349	fun
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	350	balleft :: "('a,'b) rbt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	351	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	352	"balleft (Tr R a k x b) s y c = Tr R (Tr B a k x b) s y c" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	353	"balleft bl k x (Tr B a s y b) = balance bl k x (Tr R a s y b)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	354	"balleft bl k x (Tr R (Tr B a s y b) t z c) = Tr R (Tr B bl k x a) s y (balance b t z (paint R c))" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	355	"balleft t k x s = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	356
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	357	lemma balleft_inv2_with_inv1:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	358	assumes "inv2 lt" "inv2 rt" "bh lt + 1 = bh rt" "inv1 rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	359	shows "bh (balleft lt k v rt) = bh lt + 1"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	360	and "inv2 (balleft lt k v rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	361	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	362	by (induct lt k v rt rule: balleft.induct) (auto simp: balance_inv2 balance_bh)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	363
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	364	lemma balleft_inv2_app:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	365	assumes "inv2 lt" "inv2 rt" "bh lt + 1 = bh rt" "treec rt = B"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	366	shows "inv2 (balleft lt k v rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	367	"bh (balleft lt k v rt) = bh rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	368	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	369	by (induct lt k v rt rule: balleft.induct) (auto simp add: balance_inv2 balance_bh)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	370
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	371	lemma balleft_inv1: "\<lbrakk>inv1l a; inv1 b; treec b = B\<rbrakk> \<Longrightarrow> inv1 (balleft a k x b)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	372	by (induct a k x b rule: balleft.induct) (simp add: balance_inv1)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	373
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	374	lemma balleft_inv1l: "\<lbrakk> inv1l lt; inv1 rt \<rbrakk> \<Longrightarrow> inv1l (balleft lt k x rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	375	by (induct lt k x rt rule: balleft.induct) (auto simp: balance_inv1)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	376
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	377	lemma balleft_st: "\<lbrakk> st l; st r; tlt k l; tgt k r \<rbrakk> \<Longrightarrow> st (balleft l k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	378	apply (induct l k v r rule: balleft.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	379	apply (auto simp: balance_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	380	apply (unfold tgt_prop tlt_prop)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	381	by force+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	382
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	383	lemma balleft_tgt:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	384	fixes k :: "'a::order"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	385	assumes "k \<guillemotleft>\| a" "k \<guillemotleft>\| b" "k < x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	386	shows "k \<guillemotleft>\| balleft a x t b"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	387	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	388	by (induct a x t b rule: balleft.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	389
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	390	lemma balleft_tlt:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	391	fixes k :: "'a::order"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	392	assumes "a \|\<guillemotleft> k" "b \|\<guillemotleft> k" "x < k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	393	shows "balleft a x t b \|\<guillemotleft> k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	394	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	395	by (induct a x t b rule: balleft.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	396
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	397	lemma balleft_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	398	assumes "inv1l l" "inv1 r" "bh l + 1 = bh r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	399	shows "pin_tree k v (balleft l a b r) = (pin_tree k v l \<or> k = a \<and> v = b \<or> pin_tree k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	400	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	401	by (induct l k v r rule: balleft.induct) (auto simp: balance_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	402
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	403	fun
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	404	balright :: "('a,'b) rbt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	405	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	406	"balright a k x (Tr R b s y c) = Tr R a k x (Tr B b s y c)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	407	"balright (Tr B a k x b) s y bl = balance (Tr R a k x b) s y bl" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	408	"balright (Tr R a k x (Tr B b s y c)) t z bl = Tr R (balance (paint R a) k x b) s y (Tr B c t z bl)" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	409	"balright t k x s = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	410
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	411	lemma balright_inv2_with_inv1:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	412	assumes "inv2 lt" "inv2 rt" "bh lt = bh rt + 1" "inv1 lt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	413	shows "inv2 (balright lt k v rt) \<and> bh (balright lt k v rt) = bh lt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	414	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	415	by (induct lt k v rt rule: balright.induct) (auto simp: balance_inv2 balance_bh)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	416
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	417	lemma balright_inv1: "\<lbrakk>inv1 a; inv1l b; treec a = B\<rbrakk> \<Longrightarrow> inv1 (balright a k x b)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	418	by (induct a k x b rule: balright.induct) (simp add: balance_inv1)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	419
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	420	lemma balright_inv1l: "\<lbrakk> inv1 lt; inv1l rt \<rbrakk> \<Longrightarrow>inv1l (balright lt k x rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	421	by (induct lt k x rt rule: balright.induct) (auto simp: balance_inv1)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	422
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	423	lemma balright_st: "\<lbrakk> st l; st r; tlt k l; tgt k r \<rbrakk> \<Longrightarrow> st (balright l k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	424	apply (induct l k v r rule: balright.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	425	apply (auto simp:balance_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	426	apply (unfold tlt_prop tgt_prop)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	427	by force+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	428
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	429	lemma balright_tgt:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	430	fixes k :: "'a::order"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	431	assumes "k \<guillemotleft>\| a" "k \<guillemotleft>\| b" "k < x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	432	shows "k \<guillemotleft>\| balright a x t b"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	433	using assms by (induct a x t b rule: balright.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	434
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	435	lemma balright_tlt:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	436	fixes k :: "'a::order"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	437	assumes "a \|\<guillemotleft> k" "b \|\<guillemotleft> k" "x < k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	438	shows "balright a x t b \|\<guillemotleft> k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	439	using assms by (induct a x t b rule: balright.induct) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	440
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	441	lemma balright_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	442	assumes "inv1 l" "inv1l r" "bh l = bh r + 1" "inv2 l" "inv2 r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	443	shows "pin_tree x y (balright l k v r) = (pin_tree x y l \<or> x = k \<and> y = v \<or> pin_tree x y r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	444	using assms by (induct l k v r rule: balright.induct) (auto simp: balance_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	445
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	446
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	447	text {* app *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	448
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	449	fun
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	450	app :: "('a,'b) rbt \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	451	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	452	"app Empty x = x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	453	\| "app x Empty = x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	454	\| "app (Tr R a k x b) (Tr R c s y d) = (case (app b c) of
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	455	Tr R b2 t z c2 \<Rightarrow> (Tr R (Tr R a k x b2) t z (Tr R c2 s y d)) \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	456	bc \<Rightarrow> Tr R a k x (Tr R bc s y d))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	457	\| "app (Tr B a k x b) (Tr B c s y d) = (case (app b c) of
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	458	Tr R b2 t z c2 \<Rightarrow> Tr R (Tr B a k x b2) t z (Tr B c2 s y d) \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	459	bc \<Rightarrow> balleft a k x (Tr B bc s y d))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	460	\| "app a (Tr R b k x c) = Tr R (app a b) k x c"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	461	\| "app (Tr R a k x b) c = Tr R a k x (app b c)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	462
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	463	lemma app_inv2:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	464	assumes "inv2 lt" "inv2 rt" "bh lt = bh rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	465	shows "bh (app lt rt) = bh lt" "inv2 (app lt rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	466	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	467	by (induct lt rt rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	468	(auto simp: balleft_inv2_app split: rbt.splits color.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	469
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	470	lemma app_inv1:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	471	assumes "inv1 lt" "inv1 rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	472	shows "treec lt = B \<Longrightarrow> treec rt = B \<Longrightarrow> inv1 (app lt rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	473	"inv1l (app lt rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	474	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	475	by (induct lt rt rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	476	(auto simp: balleft_inv1 split: rbt.splits color.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	477
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	478	lemma app_tgt[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	479	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	480	assumes "k \<guillemotleft>\| l" "k \<guillemotleft>\| r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	481	shows "k \<guillemotleft>\| app l r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	482	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	483	by (induct l r rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	484	(auto simp: balleft_tgt split:rbt.splits color.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	485
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	486	lemma app_tlt[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	487	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	488	assumes "l \|\<guillemotleft> k" "r \|\<guillemotleft> k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	489	shows "app l r \|\<guillemotleft> k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	490	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	491	by (induct l r rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	492	(auto simp: balleft_tlt split:rbt.splits color.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	493
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	494	lemma app_st:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	495	fixes k :: "'a::linorder"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	496	assumes "st l" "st r" "l \|\<guillemotleft> k" "k \<guillemotleft>\| r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	497	shows "st (app l r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	498	using assms proof (induct l r rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	499	case (3 a x v b c y w d)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	500	hence ineqs: "a \|\<guillemotleft> x" "x \<guillemotleft>\| b" "b \|\<guillemotleft> k" "k \<guillemotleft>\| c" "c \|\<guillemotleft> y" "y \<guillemotleft>\| d"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	501	by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	502	with 3
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	503	show ?case
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	504	apply (cases "app b c" rule: rbt_cases)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	505	apply auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	506	by (metis app_tgt app_tlt ineqs ineqs tlt.simps(2) tgt.simps(2) tgt_trans tlt_trans)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	507	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	508	case (4 a x v b c y w d)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	509	hence "x < k \<and> tgt k c" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	510	hence "tgt x c" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	511	with 4 have 2: "tgt x (app b c)" by (simp add: app_tgt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	512	from 4 have "k < y \<and> tlt k b" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	513	hence "tlt y b" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	514	with 4 have 3: "tlt y (app b c)" by (simp add: app_tlt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	515	show ?case
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	516	proof (cases "app b c" rule: rbt_cases)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	517	case Empty
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	518	from 4 have "x < y \<and> tgt y d" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	519	hence "tgt x d" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	520	with 4 Empty have "st a" and "st (Tr B Empty y w d)" and "tlt x a" and "tgt x (Tr B Empty y w d)" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	521	with Empty show ?thesis by (simp add: balleft_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	522	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	523	case (Red lta va ka rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	524	with 2 4 have "x < va \<and> tlt x a" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	525	hence 5: "tlt va a" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	526	from Red 3 4 have "va < y \<and> tgt y d" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	527	hence "tgt va d" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	528	with Red 2 3 4 5 show ?thesis by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	529	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	530	case (Black lta va ka rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	531	from 4 have "x < y \<and> tgt y d" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	532	hence "tgt x d" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	533	with Black 2 3 4 have "st a" and "st (Tr B (app b c) y w d)" and "tlt x a" and "tgt x (Tr B (app b c) y w d)" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	534	with Black show ?thesis by (simp add: balleft_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	535	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	536	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	537	case (5 va vb vd vc b x w c)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	538	hence "k < x \<and> tlt k (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	539	hence "tlt x (Tr B va vb vd vc)" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	540	with 5 show ?case by (simp add: app_tlt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	541	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	542	case (6 a x v b va vb vd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	543	hence "x < k \<and> tgt k (Tr B va vb vd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	544	hence "tgt x (Tr B va vb vd vc)" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	545	with 6 show ?case by (simp add: app_tgt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	546	qed simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	547
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	548	lemma app_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	549	assumes "inv2 l" "inv2 r" "bh l = bh r" "inv1 l" "inv1 r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	550	shows "pin_tree k v (app l r) = (pin_tree k v l \<or> pin_tree k v r)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	551	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	552	proof (induct l r rule: app.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	553	case (4 _ _ _ b c)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	554	hence a: "bh (app b c) = bh b" by (simp add: app_inv2)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	555	from 4 have b: "inv1l (app b c)" by (simp add: app_inv1)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	556
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	557	show ?case
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	558	proof (cases "app b c" rule: rbt_cases)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	559	case Empty
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	560	with 4 a show ?thesis by (auto simp: balleft_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	561	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	562	case (Red lta ka va rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	563	with 4 show ?thesis by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	564	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	565	case (Black lta ka va rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	566	with a b 4 show ?thesis by (auto simp: balleft_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	567	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	568	qed (auto split: rbt.splits color.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	569
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	570	fun
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	571	delformLeft :: "('a\<Colon>linorder) \<Rightarrow> ('a,'b) rbt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt" and
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	572	delformRight :: "('a\<Colon>linorder) \<Rightarrow> ('a,'b) rbt \<Rightarrow> 'a \<Rightarrow> 'b \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt" and
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	573	del :: "('a\<Colon>linorder) \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	574	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	575	"del x Empty = Empty" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	576	"del x (Tr c a y s b) = (if x < y then delformLeft x a y s b else (if x > y then delformRight x a y s b else app a b))" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	577	"delformLeft x (Tr B lt z v rt) y s b = balleft (del x (Tr B lt z v rt)) y s b" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	578	"delformLeft x a y s b = Tr R (del x a) y s b" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	579	"delformRight x a y s (Tr B lt z v rt) = balright a y s (del x (Tr B lt z v rt))" \|
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	580	"delformRight x a y s b = Tr R a y s (del x b)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	581
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	582	lemma
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	583	assumes "inv2 lt" "inv1 lt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	584	shows
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	585	"\<lbrakk>inv2 rt; bh lt = bh rt; inv1 rt\<rbrakk> \<Longrightarrow>
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	586	inv2 (delformLeft x lt k v rt) \<and> bh (delformLeft x lt k v rt) = bh lt \<and> (treec lt = B \<and> treec rt = B \<and> inv1 (delformLeft x lt k v rt) \<or> (treec lt \<noteq> B \<or> treec rt \<noteq> B) \<and> inv1l (delformLeft x lt k v rt))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	587	and "\<lbrakk>inv2 rt; bh lt = bh rt; inv1 rt\<rbrakk> \<Longrightarrow>
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	588	inv2 (delformRight x lt k v rt) \<and> bh (delformRight x lt k v rt) = bh lt \<and> (treec lt = B \<and> treec rt = B \<and> inv1 (delformRight x lt k v rt) \<or> (treec lt \<noteq> B \<or> treec rt \<noteq> B) \<and> inv1l (delformRight x lt k v rt))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	589	and del_inv1_inv2: "inv2 (del x lt) \<and> (treec lt = R \<and> bh (del x lt) = bh lt \<and> inv1 (del x lt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	590	\<or> treec lt = B \<and> bh (del x lt) = bh lt - 1 \<and> inv1l (del x lt))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	591	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	592	proof (induct x lt k v rt and x lt k v rt and x lt rule: delformLeft_delformRight_del.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	593	case (2 y c _ y')
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	594	have "y = y' \<or> y < y' \<or> y > y'" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	595	thus ?case proof (elim disjE)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	596	assume "y = y'"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	597	with 2 show ?thesis by (cases c) (simp add: app_inv2 app_inv1)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	598	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	599	assume "y < y'"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	600	with 2 show ?thesis by (cases c) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	601	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	602	assume "y' < y"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	603	with 2 show ?thesis by (cases c) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	604	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	605	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	606	case (3 y lt z v rta y' ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	607	thus ?case by (cases "treec (Tr B lt z v rta) = B \<and> treec bb = B") (simp add: balleft_inv2_with_inv1 balleft_inv1 balleft_inv1l)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	608	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	609	case (5 y a y' ss lt z v rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	610	thus ?case by (cases "treec a = B \<and> treec (Tr B lt z v rta) = B") (simp add: balright_inv2_with_inv1 balright_inv1 balright_inv1l)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	611	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	612	case ("6_1" y a y' ss) thus ?case by (cases "treec a = B \<and> treec Empty = B") simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	613	qed auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	614
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	615	lemma
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	616	delformLeft_tlt: "\<lbrakk>tlt v lt; tlt v rt; k < v\<rbrakk> \<Longrightarrow> tlt v (delformLeft x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	617	and delformRight_tlt: "\<lbrakk>tlt v lt; tlt v rt; k < v\<rbrakk> \<Longrightarrow> tlt v (delformRight x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	618	and del_tlt: "tlt v lt \<Longrightarrow> tlt v (del x lt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	619	by (induct x lt k y rt and x lt k y rt and x lt rule: delformLeft_delformRight_del.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	620	(auto simp: balleft_tlt balright_tlt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	621
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	622	lemma delformLeft_tgt: "\<lbrakk>tgt v lt; tgt v rt; k > v\<rbrakk> \<Longrightarrow> tgt v (delformLeft x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	623	and delformRight_tgt: "\<lbrakk>tgt v lt; tgt v rt; k > v\<rbrakk> \<Longrightarrow> tgt v (delformRight x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	624	and del_tgt: "tgt v lt \<Longrightarrow> tgt v (del x lt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	625	by (induct x lt k y rt and x lt k y rt and x lt rule: delformLeft_delformRight_del.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	626	(auto simp: balleft_tgt balright_tgt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	627
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	628	lemma "\<lbrakk>st lt; st rt; tlt k lt; tgt k rt\<rbrakk> \<Longrightarrow> st (delformLeft x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	629	and "\<lbrakk>st lt; st rt; tlt k lt; tgt k rt\<rbrakk> \<Longrightarrow> st (delformRight x lt k y rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	630	and del_st: "st lt \<Longrightarrow> st (del x lt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	631	proof (induct x lt k y rt and x lt k y rt and x lt rule: delformLeft_delformRight_del.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	632	case (3 x lta zz v rta yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	633	from 3 have "tlt yy (Tr B lta zz v rta)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	634	hence "tlt yy (del x (Tr B lta zz v rta))" by (rule del_tlt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	635	with 3 show ?case by (simp add: balleft_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	636	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	637	case ("4_2" x vaa vbb vdd vc yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	638	hence "tlt yy (Tr R vaa vbb vdd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	639	hence "tlt yy (del x (Tr R vaa vbb vdd vc))" by (rule del_tlt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	640	with "4_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	641	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	642	case (5 x aa yy ss lta zz v rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	643	hence "tgt yy (Tr B lta zz v rta)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	644	hence "tgt yy (del x (Tr B lta zz v rta))" by (rule del_tgt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	645	with 5 show ?case by (simp add: balright_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	646	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	647	case ("6_2" x aa yy ss vaa vbb vdd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	648	hence "tgt yy (Tr R vaa vbb vdd vc)" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	649	hence "tgt yy (del x (Tr R vaa vbb vdd vc))" by (rule del_tgt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	650	with "6_2" show ?case by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	651	qed (auto simp: app_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	652
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	653	lemma "\<lbrakk>st lt; st rt; tlt kt lt; tgt kt rt; inv1 lt; inv1 rt; inv2 lt; inv2 rt; bh lt = bh rt; x < kt\<rbrakk> \<Longrightarrow> pin_tree k v (delformLeft x lt kt y rt) = (False \<or> (x \<noteq> k \<and> pin_tree k v (Tr c lt kt y rt)))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	654	and "\<lbrakk>st lt; st rt; tlt kt lt; tgt kt rt; inv1 lt; inv1 rt; inv2 lt; inv2 rt; bh lt = bh rt; x > kt\<rbrakk> \<Longrightarrow> pin_tree k v (delformRight x lt kt y rt) = (False \<or> (x \<noteq> k \<and> pin_tree k v (Tr c lt kt y rt)))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	655	and del_pit: "\<lbrakk>st t; inv1 t; inv2 t\<rbrakk> \<Longrightarrow> pin_tree k v (del x t) = (False \<or> (x \<noteq> k \<and> pin_tree k v t))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	656	proof (induct x lt kt y rt and x lt kt y rt and x t rule: delformLeft_delformRight_del.induct)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	657	case (2 xx c aa yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	658	have "xx = yy \<or> xx < yy \<or> xx > yy" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	659	from this 2 show ?case proof (elim disjE)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	660	assume "xx = yy"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	661	with 2 show ?thesis proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	662	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	663	from 2 `xx = yy` `xx = k` have "st (Tr c aa yy ss bb) \<and> k = yy" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	664	hence "\<not> pin_tree k v aa" "\<not> pin_tree k v bb" by (auto simp: tlt_nit tgt_prop)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	665	with `xx = yy` 2 `xx = k` show ?thesis by (simp add: app_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	666	qed (simp add: app_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	667	qed simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	668	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	669	case (3 xx lta zz vv rta yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	670	def mt[simp]: mt == "Tr B lta zz vv rta"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	671	from 3 have "inv2 mt \<and> inv1 mt" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	672	hence "inv2 (del xx mt) \<and> (treec mt = R \<and> bh (del xx mt) = bh mt \<and> inv1 (del xx mt) \<or> treec mt = B \<and> bh (del xx mt) = bh mt - 1 \<and> inv1l (del xx mt))" by (blast dest: del_inv1_inv2)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	673	with 3 have 4: "pin_tree k v (delformLeft xx mt yy ss bb) = (False \<or> xx \<noteq> k \<and> pin_tree k v mt \<or> (k = yy \<and> v = ss) \<or> pin_tree k v bb)" by (simp add: balleft_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	674	thus ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	675	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	676	from 3 True have "tgt yy bb \<and> yy > k" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	677	hence "tgt k bb" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	678	with 3 4 True show ?thesis by (auto simp: tgt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	679	qed auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	680	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	681	case ("4_1" xx yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	682	show ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	683	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	684	with "4_1" have "tgt yy bb \<and> k < yy" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	685	hence "tgt k bb" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	686	with "4_1" `xx = k`
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	687	have "pin_tree k v (Tr R Empty yy ss bb) = pin_tree k v Empty" by (auto simp: tgt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	688	thus ?thesis by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	689	qed simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	690	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	691	case ("4_2" xx vaa vbb vdd vc yy ss bb)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	692	thus ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	693	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	694	with "4_2" have "k < yy \<and> tgt yy bb" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	695	hence "tgt k bb" by (blast dest: tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	696	with True "4_2" show ?thesis by (auto simp: tgt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	697	qed simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	698	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	699	case (5 xx aa yy ss lta zz vv rta)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	700	def mt[simp]: mt == "Tr B lta zz vv rta"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	701	from 5 have "inv2 mt \<and> inv1 mt" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	702	hence "inv2 (del xx mt) \<and> (treec mt = R \<and> bh (del xx mt) = bh mt \<and> inv1 (del xx mt) \<or> treec mt = B \<and> bh (del xx mt) = bh mt - 1 \<and> inv1l (del xx mt))" by (blast dest: del_inv1_inv2)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	703	with 5 have 3: "pin_tree k v (delformRight xx aa yy ss mt) = (pin_tree k v aa \<or> (k = yy \<and> v = ss) \<or> False \<or> xx \<noteq> k \<and> pin_tree k v mt)" by (simp add: balright_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	704	thus ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	705	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	706	from 5 True have "tlt yy aa \<and> yy < k" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	707	hence "tlt k aa" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	708	with 3 5 True show ?thesis by (auto simp: tlt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	709	qed auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	710	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	711	case ("6_1" xx aa yy ss)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	712	show ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	713	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	714	with "6_1" have "tlt yy aa \<and> k > yy" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	715	hence "tlt k aa" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	716	with "6_1" `xx = k` show ?thesis by (auto simp: tlt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	717	qed simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	718	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	719	case ("6_2" xx aa yy ss vaa vbb vdd vc)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	720	thus ?case proof (cases "xx = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	721	case True
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	722	with "6_2" have "k > yy \<and> tlt yy aa" by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	723	hence "tlt k aa" by (blast dest: tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	724	with True "6_2" show ?thesis by (auto simp: tlt_nit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	725	qed simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	726	qed simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	727
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	728
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	729	definition delete where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	730	delete_def: "delete k t = paint B (del k t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	731
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	732	theorem delete_isrbt[simp]: assumes "isrbt t" shows "isrbt (delete k t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	733	proof -
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	734	from assms have "inv2 t" and "inv1 t" unfolding isrbt_def by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	735	hence "inv2 (del k t) \<and> (treec t = R \<and> bh (del k t) = bh t \<and> inv1 (del k t) \<or> treec t = B \<and> bh (del k t) = bh t - 1 \<and> inv1l (del k t))" by (rule del_inv1_inv2)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	736	hence "inv2 (del k t) \<and> inv1l (del k t)" by (cases "treec t") auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	737	with assms show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	738	unfolding isrbt_def delete_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	739	by (auto intro: paint_st del_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	740	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	741
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	742	lemma delete_pit:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	743	assumes "isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	744	shows "pin_tree k v (delete x t) = (x \<noteq> k \<and> pin_tree k v t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	745	using assms unfolding isrbt_def delete_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	746	by (auto simp: del_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	747
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	748	lemma map_of_delete:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	749	assumes isrbt: "isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	750	shows "map_of (delete k t) = (map_of t)\|`(-{k})"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	751	proof
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	752	fix x
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	753	show "map_of (delete k t) x = (map_of t \|` (-{k})) x"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	754	proof (cases "x = k")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	755	assume "x = k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	756	with isrbt show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	757	by (cases "map_of (delete k t) k") (auto simp: mapof_pit delete_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	758	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	759	assume "x \<noteq> k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	760	thus ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	761	by auto (metis isrbt delete_isrbt delete_pit isrbt_st mapof_from_pit)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	762	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	763	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	764
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	765	subsection {* Union *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	766
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	767	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	768	unionwithkey :: "('a\<Colon>linorder \<Rightarrow> 'b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	769	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	770	"unionwithkey f t Empty = t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	771	\| "unionwithkey f t (Tr c lt k v rt) = unionwithkey f (unionwithkey f (insertwithkey f k v t) lt) rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	772
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	773	lemma unionwk_st: "st lt \<Longrightarrow> st (unionwithkey f lt rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	774	by (induct rt arbitrary: lt) (auto simp: insertwk_st)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	775	theorem unionwk_isrbt[simp]: "isrbt lt \<Longrightarrow> isrbt (unionwithkey f lt rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	776	by (induct rt arbitrary: lt) (simp add: insertwk_isrbt)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	777
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	778	definition
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	779	unionwith where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	780	"unionwith f = unionwithkey (\<lambda>_. f)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	781
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	782	theorem unionw_isrbt: "isrbt lt \<Longrightarrow> isrbt (unionwith f lt rt)" unfolding unionwith_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	783
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	784	definition union where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	785	"union = unionwithkey (%_ _ rv. rv)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	786
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	787	theorem union_isrbt: "isrbt lt \<Longrightarrow> isrbt (union lt rt)" unfolding union_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	788
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	789	lemma union_Tr[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	790	"union t (Tr c lt k v rt) = union (union (insrt k v t) lt) rt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	791	unfolding union_def insrt_def
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	792	by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	793
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	794	lemma map_of_union:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	795	assumes "isrbt s" "st t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	796	shows "map_of (union s t) = map_of s ++ map_of t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	797	using assms
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	798	proof (induct t arbitrary: s)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	799	case Empty thus ?case by (auto simp: union_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	800	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	801	case (Tr c l k v r s)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	802	hence strl: "st r" "st l" "l \|\<guillemotleft> k" "k \<guillemotleft>\| r" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	803
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	804	have meq: "map_of s(k \<mapsto> v) ++ map_of l ++ map_of r =
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	805	map_of s ++
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	806	(\<lambda>a. if a < k then map_of l a
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	807	else if k < a then map_of r a else Some v)" (is "?m1 = ?m2")
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	808	proof (rule ext)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	809	fix a
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	810
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	811	have "k < a \<or> k = a \<or> k > a" by auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	812	thus "?m1 a = ?m2 a"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	813	proof (elim disjE)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	814	assume "k < a"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	815	with `l \|\<guillemotleft> k` have "l \|\<guillemotleft> a" by (rule tlt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	816	with `k < a` show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	817	by (auto simp: map_add_def split: option.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	818	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	819	assume "k = a"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	820	with `l \|\<guillemotleft> k` `k \<guillemotleft>\| r`
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	821	show ?thesis by (auto simp: map_add_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	822	next
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	823	assume "a < k"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	824	from this `k \<guillemotleft>\| r` have "a \<guillemotleft>\| r" by (rule tgt_trans)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	825	with `a < k` show ?thesis
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	826	by (auto simp: map_add_def split: option.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	827	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	828	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	829
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	830	from Tr
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	831	have IHs:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	832	"map_of (union (union (insrt k v s) l) r) = map_of (union (insrt k v s) l) ++ map_of r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	833	"map_of (union (insrt k v s) l) = map_of (insrt k v s) ++ map_of l"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	834	by (auto intro: union_isrbt insrt_isrbt)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	835
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	836	with meq show ?case
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	837	by (auto simp: map_of_insert[OF Tr(3)])
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	838	qed
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	839
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	840	subsection {* Adjust *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	841
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	842	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	843	adjustwithkey :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> ('a\<Colon>linorder) \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'b) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	844	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	845	"adjustwithkey f k Empty = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	846	\| "adjustwithkey f k (Tr c lt x v rt) = (if k < x then (Tr c (adjustwithkey f k lt) x v rt) else if k > x then (Tr c lt x v (adjustwithkey f k rt)) else (Tr c lt x (f x v) rt))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	847
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	848	lemma adjustwk_treec: "treec (adjustwithkey f k t) = treec t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	849	lemma adjustwk_inv1: "inv1 (adjustwithkey f k t) = inv1 t" by (induct t) (simp add: adjustwk_treec)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	850	lemma adjustwk_inv2: "inv2 (adjustwithkey f k t) = inv2 t" "bh (adjustwithkey f k t) = bh t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	851	lemma adjustwk_tgt: "tgt k (adjustwithkey f kk t) = tgt k t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	852	lemma adjustwk_tlt: "tlt k (adjustwithkey f kk t) = tlt k t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	853	lemma adjustwk_st: "st (adjustwithkey f k t) = st t" by (induct t) (simp add: adjustwk_tlt adjustwk_tgt)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	854
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	855	theorem adjustwk_isrbt[simp]: "isrbt (adjustwithkey f k t) = isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	856	unfolding isrbt_def by (simp add: adjustwk_inv2 adjustwk_treec adjustwk_st adjustwk_inv1 )
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	857
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	858	theorem adjustwithkey_map[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	859	"map_of (adjustwithkey f k t) x =
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	860	(if x = k then case map_of t x of None \<Rightarrow> None \| Some y \<Rightarrow> Some (f k y)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	861	else map_of t x)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	862	by (induct t arbitrary: x) (auto split:option.splits)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	863
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	864	definition adjust where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	865	"adjust f = adjustwithkey (\<lambda>_. f)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	866
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	867	theorem adjust_isrbt[simp]: "isrbt (adjust f k t) = isrbt t" unfolding adjust_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	868
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	869	theorem adjust_map[simp]:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	870	"map_of (adjust f k t) x =
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	871	(if x = k then case map_of t x of None \<Rightarrow> None \| Some y \<Rightarrow> Some (f y)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	872	else map_of t x)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	873	unfolding adjust_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	874
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	875	subsection {* Map *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	876
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	877	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	878	mapwithkey :: "('a::linorder \<Rightarrow> 'b \<Rightarrow> 'c) \<Rightarrow> ('a,'b) rbt \<Rightarrow> ('a,'c) rbt"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	879	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	880	"mapwithkey f Empty = Empty"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	881	\| "mapwithkey f (Tr c lt k v rt) = Tr c (mapwithkey f lt) k (f k v) (mapwithkey f rt)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	882
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	883	theorem mapwk_keys[simp]: "keys (mapwithkey f t) = keys t" by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	884	lemma mapwk_tgt: "tgt k (mapwithkey f t) = tgt k t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	885	lemma mapwk_tlt: "tlt k (mapwithkey f t) = tlt k t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	886	lemma mapwk_st: "st (mapwithkey f t) = st t" by (induct t) (simp add: mapwk_tlt mapwk_tgt)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	887	lemma mapwk_treec: "treec (mapwithkey f t) = treec t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	888	lemma mapwk_inv1: "inv1 (mapwithkey f t) = inv1 t" by (induct t) (simp add: mapwk_treec)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	889	lemma mapwk_inv2: "inv2 (mapwithkey f t) = inv2 t" "bh (mapwithkey f t) = bh t" by (induct t) simp+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	890	theorem mapwk_isrbt[simp]: "isrbt (mapwithkey f t) = isrbt t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	891	unfolding isrbt_def by (simp add: mapwk_inv1 mapwk_inv2 mapwk_st mapwk_treec)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	892
30235 58d147683393 Made Option a separate theory and renamed option_map to Option.map nipkow parents: 27368 diff changeset	893	theorem map_of_mapwk[simp]: "map_of (mapwithkey f t) x = Option.map (f x) (map_of t x)"
26192 52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	894	by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	895
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	896	definition map
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	897	where map_def: "map f == mapwithkey (\<lambda>_. f)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	898
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	899	theorem map_keys[simp]: "keys (map f t) = keys t" unfolding map_def by simp
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	900	theorem map_isrbt[simp]: "isrbt (map f t) = isrbt t" unfolding map_def by simp
30235 58d147683393 Made Option a separate theory and renamed option_map to Option.map nipkow parents: 27368 diff changeset	901	theorem map_of_map[simp]: "map_of (map f t) = Option.map f o map_of t"
26192 52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	902	by (rule ext) (simp add:map_def)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	903
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	904	subsection {* Fold *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	905
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	906	text {* The following is still incomplete... *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	907
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	908	primrec
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	909	foldwithkey :: "('a::linorder \<Rightarrow> 'b \<Rightarrow> 'c \<Rightarrow> 'c) \<Rightarrow> ('a,'b) rbt \<Rightarrow> 'c \<Rightarrow> 'c"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	910	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	911	"foldwithkey f Empty v = v"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	912	\| "foldwithkey f (Tr c lt k x rt) v = foldwithkey f rt (f k x (foldwithkey f lt v))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	913
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	914	primrec alist_of
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	915	where
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	916	"alist_of Empty = []"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	917	\| "alist_of (Tr _ l k v r) = alist_of l @ (k,v) # alist_of r"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	918
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	919	lemma map_of_alist_of:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	920	shows "st t \<Longrightarrow> Map.map_of (alist_of t) = map_of t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	921	oops
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	922
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	923	lemma fold_alist_fold:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	924	"foldwithkey f t x = foldl (\<lambda>x (k,v). f k v x) x (alist_of t)"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	925	by (induct t arbitrary: x) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	926
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	927	lemma alist_pit[simp]: "(k, v) \<in> set (alist_of t) = pin_tree k v t"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	928	by (induct t) auto
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	929
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	930	lemma sorted_alist:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	931	"st t \<Longrightarrow> sorted (List.map fst (alist_of t))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	932	by (induct t)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	933	(force simp: sorted_append sorted_Cons tlgt_props
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	934	dest!:pint_keys)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	935
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	936	lemma distinct_alist:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	937	"st t \<Longrightarrow> distinct (List.map fst (alist_of t))"
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	938	by (induct t)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	939	(force simp: sorted_append sorted_Cons tlgt_props
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	940	dest!:pint_keys)+
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	941	(>)
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	942
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	943	text {*
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	944	This theory defines purely functional red-black trees which can be
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	945	used as an efficient representation of finite maps.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	946	*}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	947
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	948	subsection {* Data type and invariant *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	949
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	950	text {*
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	951	The type @{typ "('k, 'v) rbt"} denotes red-black trees with keys of
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	952	type @{typ "'k"} and values of type @{typ "'v"}. To function
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	953	properly, the key type must belong to the @{text "linorder"} class.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	954
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	955	A value @{term t} of this type is a valid red-black tree if it
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	956	satisfies the invariant @{text "isrbt t"}.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	957	This theory provides lemmas to prove that the invariant is
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	958	satisfied throughout the computation.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	959
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	960	The interpretation function @{const "map_of"} returns the partial
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	961	map represented by a red-black tree:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	962	@{term_type[display] "map_of"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	963
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	964	This function should be used for reasoning about the semantics of the RBT
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	965	operations. Furthermore, it implements the lookup functionality for
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	966	the data structure: It is executable and the lookup is performed in
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	967	$O(\log n)$.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	968	*}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	969
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	970	subsection {* Operations *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	971
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	972	text {*
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	973	Currently, the following operations are supported:
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	974
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	975	@{term_type[display] "Empty"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	976	Returns the empty tree. $O(1)$
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	977
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	978	@{term_type[display] "insrt"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	979	Updates the map at a given position. $O(\log n)$
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	980
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	981	@{term_type[display] "delete"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	982	Deletes a map entry at a given position. $O(\log n)$
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	983
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	984	@{term_type[display] "union"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	985	Forms the union of two trees, preferring entries from the first one.
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	986
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	987	@{term_type[display] "map"}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	988	Maps a function over the values of a map. $O(n)$
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	989	*}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	990
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	991
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	992	subsection {* Invariant preservation *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	993
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	994	text {*
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	995	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	996	@{thm Empty_isrbt}\hfill(@{text "Empty_isrbt"})
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	997
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	998	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	999	@{thm insrt_isrbt}\hfill(@{text "insrt_isrbt"})
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1000
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1001	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1002	@{thm delete_isrbt}\hfill(@{text "delete_isrbt"})
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1003
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1004	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1005	@{thm union_isrbt}\hfill(@{text "union_isrbt"})
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1006
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1007	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1008	@{thm map_isrbt}\hfill(@{text "map_isrbt"})
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1009	*}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1010
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1011	subsection {* Map Semantics *}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1012
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1013	text {*
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1014	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1015	\underline{@{text "map_of_Empty"}}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1016	@{thm[display] map_of_Empty}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1017	\vspace{1ex}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1018
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1019	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1020	\underline{@{text "map_of_insert"}}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1021	@{thm[display] map_of_insert}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1022	\vspace{1ex}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1023
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1024	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1025	\underline{@{text "map_of_delete"}}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1026	@{thm[display] map_of_delete}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1027	\vspace{1ex}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1028
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1029	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1030	\underline{@{text "map_of_union"}}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1031	@{thm[display] map_of_union}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1032	\vspace{1ex}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1033
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1034	\noindent
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1035	\underline{@{text "map_of_map"}}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1036	@{thm[display] map_of_map}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1037	\vspace{1ex}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1038	*}
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1039
52617dca8386 new theory of red-black trees, an efficient implementation of finite maps. krauss parents: diff changeset	1040	end

author	nipkow
	Sun, 10 May 2009 14:21:41 +0200
changeset 31084	f4db921165ce
parent 30738	0842e906300c
child 32237	cdc76a42fed4
permissions	-rw-r--r--