isabelle: src/HOL/Data_Structures/RBT_Map.thy@3b98b1b57435 (annotated)

61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	1	(* Author: Tobias Nipkow *)
759b5299a9f2 added red black trees nipkow parents: diff changeset	2
759b5299a9f2 added red black trees nipkow parents: diff changeset	3	section \<open>Red-Black Tree Implementation of Maps\<close>
759b5299a9f2 added red black trees nipkow parents: diff changeset	4
759b5299a9f2 added red black trees nipkow parents: diff changeset	5	theory RBT_Map
759b5299a9f2 added red black trees nipkow parents: diff changeset	6	imports
759b5299a9f2 added red black trees nipkow parents: diff changeset	7	RBT_Set
61231 cc6969542f8d tuned nipkow parents: 61224 diff changeset	8	Lookup2
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	9	begin
759b5299a9f2 added red black trees nipkow parents: diff changeset	10
63411 e051eea34990 got rid of class cmp; added height-size proofs by Daniel Stuewe nipkow parents: 61790 diff changeset	11	fun upd :: "'a::linorder \<Rightarrow> 'b \<Rightarrow> ('a'b) rbt \<Rightarrow> ('a'b) rbt" where
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	12	"upd x y Leaf = R Leaf (x,y) Leaf" \|
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	13	"upd x y (B l (a,b) r) = (case cmp x a of
64960 8be78855ee7a split balance into two, clearer etc nipkow parents: 63411 diff changeset	14	LT \<Rightarrow> baliL (upd x y l) (a,b) r \|
8be78855ee7a split balance into two, clearer etc nipkow parents: 63411 diff changeset	15	GT \<Rightarrow> baliR l (a,b) (upd x y r) \|
61581 00d9682e8dd7 Convertd to 3-way comparisons nipkow parents: 61231 diff changeset	16	EQ \<Rightarrow> B l (x,y) r)" \|
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	17	"upd x y (R l (a,b) r) = (case cmp x a of
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	18	LT \<Rightarrow> R (upd x y l) (a,b) r \|
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	19	GT \<Rightarrow> R l (a,b) (upd x y r) \|
61581 00d9682e8dd7 Convertd to 3-way comparisons nipkow parents: 61231 diff changeset	20	EQ \<Rightarrow> R l (x,y) r)"
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	21
63411 e051eea34990 got rid of class cmp; added height-size proofs by Daniel Stuewe nipkow parents: 61790 diff changeset	22	definition update :: "'a::linorder \<Rightarrow> 'b \<Rightarrow> ('a'b) rbt \<Rightarrow> ('a'b) rbt" where
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	23	"update x y t = paint Black (upd x y t)"
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	24
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	25	fun del :: "'a::linorder \<Rightarrow> ('a'b)rbt \<Rightarrow> ('a'b)rbt" where
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	26	"del x Leaf = Leaf" \|
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	27	"del x (Node l (ab, _) r) = (case cmp x (fst ab) of
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	28	LT \<Rightarrow> if l \<noteq> Leaf \<and> color l = Black
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	29	then baldL (del x l) ab r else R (del x l) ab r \|
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	30	GT \<Rightarrow> if r \<noteq> Leaf\<and> color r = Black
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	31	then baldR l ab (del x r) else R l ab (del x r) \|
71830 7a997ead54b0 "app" -> "join" for RBTs nipkow parents: 71463 diff changeset	32	EQ \<Rightarrow> join l r)"
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	33
63411 e051eea34990 got rid of class cmp; added height-size proofs by Daniel Stuewe nipkow parents: 61790 diff changeset	34	definition delete :: "'a::linorder \<Rightarrow> ('a'b) rbt \<Rightarrow> ('a'b) rbt" where
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	35	"delete x t = paint Black (del x t)"
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	36
759b5299a9f2 added red black trees nipkow parents: diff changeset	37
759b5299a9f2 added red black trees nipkow parents: diff changeset	38	subsection "Functional Correctness Proofs"
759b5299a9f2 added red black trees nipkow parents: diff changeset	39
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	40	lemma inorder_upd:
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	41	"sorted1(inorder t) \<Longrightarrow> inorder(upd x y t) = upd_list x y (inorder t)"
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	42	by(induction x y t rule: upd.induct)
64960 8be78855ee7a split balance into two, clearer etc nipkow parents: 63411 diff changeset	43	(auto simp: upd_list_simps inorder_baliL inorder_baliR)
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	44
68440 6826718f732d qualify interpretations to avoid clashes nipkow parents: 68431 diff changeset	45	lemma inorder_update:
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	46	"sorted1(inorder t) \<Longrightarrow> inorder(update x y t) = upd_list x y (inorder t)"
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	47	by(simp add: update_def inorder_upd inorder_paint)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	48
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	49	(* This lemma became necessary below when \<open>del\<close> was converted from pattern-matching to \<open>fst\<close> *)
d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	50	lemma del_list_id: "\<forall>ab\<in>set ps. y < fst ab \<Longrightarrow> x \<le> y \<Longrightarrow> del_list x ps = ps"
d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	51	by(rule del_list_idem) auto
d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	52
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	53	lemma inorder_del:
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	54	"sorted1(inorder t) \<Longrightarrow> inorder(del x t) = del_list x (inorder t)"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	55	by(induction x t rule: del.induct)
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	56	(auto simp: del_list_simps del_list_id inorder_join inorder_baldL inorder_baldR)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	57
68440 6826718f732d qualify interpretations to avoid clashes nipkow parents: 68431 diff changeset	58	lemma inorder_delete:
61749 7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	59	"sorted1(inorder t) \<Longrightarrow> inorder(delete x t) = del_list x (inorder t)"
7f530d7e552d paint root black after insert and delete nipkow parents: 61686 diff changeset	60	by(simp add: delete_def inorder_del inorder_paint)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	61
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	62
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	63	subsection \<open>Structural invariants\<close>
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	64
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	65	subsubsection \<open>Update\<close>
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	66
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	67	lemma invc_upd: assumes "invc t"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	68	shows "color t = Black \<Longrightarrow> invc (upd x y t)" "invc2 (upd x y t)"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	69	using assms
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	70	by (induct x y t rule: upd.induct) (auto simp: invc_baliL invc_baliR invc2I)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	71
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	72	lemma invh_upd: assumes "invh t"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	73	shows "invh (upd x y t)" "bheight (upd x y t) = bheight t"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	74	using assms
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	75	by(induct x y t rule: upd.induct)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	76	(auto simp: invh_baliL invh_baliR bheight_baliL bheight_baliR)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	77
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	78	theorem rbt_update: "rbt t \<Longrightarrow> rbt (update x y t)"
70708 3e11f35496b3 tuned nipkow parents: 68440 diff changeset	79	by (simp add: invc_upd(2) invh_upd(1) color_paint_Black invh_paint rbt_def update_def)
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	80
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	81
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	82	subsubsection \<open>Deletion\<close>
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	83
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	84	lemma del_invc_invh: "invh t \<Longrightarrow> invc t \<Longrightarrow> invh (del x t) \<and>
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	85	(color t = Red \<and> bheight (del x t) = bheight t \<and> invc (del x t) \<or>
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	86	color t = Black \<and> bheight (del x t) = bheight t - 1 \<and> invc2 (del x t))"
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	87	proof (induct x t rule: del.induct)
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	88	case (2 x _ ab c)
d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	89	have "x = fst ab \<or> x < fst ab \<or> x > fst ab" by auto
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	90	thus ?case proof (elim disjE)
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	91	assume "x = fst ab"
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	92	with 2 show ?thesis
71830 7a997ead54b0 "app" -> "join" for RBTs nipkow parents: 71463 diff changeset	93	by (cases c) (simp_all add: invh_join invc_join)
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	94	next
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	95	assume "x < fst ab"
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	96	with 2 show ?thesis
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	97	by(cases c)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	98	(auto simp: invh_baldL_invc invc_baldL invc2_baldL dest: neq_LeafD)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	99	next
77270 d1ca1e587a8e tuned nipkow parents: 71830 diff changeset	100	assume "fst ab < x"
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	101	with 2 show ?thesis
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	102	by(cases c)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	103	(auto simp: invh_baldR_invc invc_baldR invc2_baldR dest: neq_LeafD)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	104	qed
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	105	qed auto
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	106
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	107	theorem rbt_delete: "rbt t \<Longrightarrow> rbt (delete k t)"
70708 3e11f35496b3 tuned nipkow parents: 68440 diff changeset	108	by (metis delete_def rbt_def color_paint_Black del_invc_invh invc2I invh_paint)
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	109
68440 6826718f732d qualify interpretations to avoid clashes nipkow parents: 68431 diff changeset	110	interpretation M: Map_by_Ordered
68431 b294e095f64c more abstract naming nipkow parents: 68415 diff changeset	111	where empty = empty and lookup = lookup and update = update and delete = delete
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	112	and inorder = inorder and inv = rbt
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	113	proof (standard, goal_cases)
68431 b294e095f64c more abstract naming nipkow parents: 68415 diff changeset	114	case 1 show ?case by (simp add: empty_def)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	115	next
61790 0494964bb226 avoid name clashes nipkow parents: 61749 diff changeset	116	case 2 thus ?case by(simp add: lookup_map_of)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	117	next
68440 6826718f732d qualify interpretations to avoid clashes nipkow parents: 68431 diff changeset	118	case 3 thus ?case by(simp add: inorder_update)
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	119	next
68440 6826718f732d qualify interpretations to avoid clashes nipkow parents: 68431 diff changeset	120	case 4 thus ?case by(simp add: inorder_delete)
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	121	next
68431 b294e095f64c more abstract naming nipkow parents: 68415 diff changeset	122	case 5 thus ?case by (simp add: rbt_def empty_def)
68415 d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	123	next
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	124	case 6 thus ?case by (simp add: rbt_update)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	125	next
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	126	case 7 thus ?case by (simp add: rbt_delete)
d74ba11680d4 tuned def. of del and proved preservation of rbt (finally) nipkow parents: 68413 diff changeset	127	qed
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	128
759b5299a9f2 added red black trees nipkow parents: diff changeset	129	end

author	haftmann
	Mon, 16 Jun 2025 15:25:38 +0200
changeset 82730	3b98b1b57435
parent 77270	d1ca1e587a8e
permissions	-rw-r--r--