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Quelle RBT_Map.thy Sprache: Isabelle |
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(* Author: Tobias Nipkow *)
section \<open>Red-Black Tree Implementation of Maps\<close> theory RBT_Map imports RBT_Set Lookup2 begin fun upd :: "'a::linorder \ "upd x y Leaf = R Leaf (x,y) Leaf" | "upd x y (B l (a,b) r) = (case cmp x a of LT \<Rightarrow> baliL (upd x y l) (a,b) r | GT \<Rightarrow> baliR l (a,b) (upd x y r) | EQ \<Rightarrow> B l (x,y) r)" | "upd x y (R l (a,b) r) = (case cmp x a of LT \<Rightarrow> R (upd x y l) (a,b) r | GT \<Rightarrow> R l (a,b) (upd x y r) | EQ \<Rightarrow> R l (x,y) r)" definition update :: "'a::linorder \ "update x y t = paint Black (upd x y t)" fun del :: "'a::linorder \ "del x Leaf = Leaf" | "del x (Node l (ab, _) r) = (case cmp x (fst ab) of LT \<Rightarrow> if l \<noteq> Leaf \<and> color l = Black then baldL (del x l) ab r else R (del x l) ab r | GT \<Rightarrow> if r \<noteq> Leaf\<and> color r = Black then baldR l ab (del x r) else R l ab (del x r) | EQ \<Rightarrow> join l r)" definition delete :: "'a::linorder \ "delete x t = paint Black (del x t)" subsection "Functional Correctness Proofs" lemma inorder_upd: "sorted1(inorder t) \ by(induction x y t rule: upd.induct) (auto simp: upd_list_simps inorder_baliL inorder_baliR) lemma inorder_update: "sorted1(inorder t) \ by(simp add: update_def inorder_upd inorder_paint) (* This lemma became necessary below when \<open>del\<close> was converted from pattern-matchin lemma del_list_id: "\ by(rule del_list_idem) auto lemma inorder_del: "sorted1(inorder t) \ by(induction x t rule: del.induct) (auto simp: del_list_simps del_list_id inorder_join inorder_baldL inorder_baldR) lemma inorder_delete: "sorted1(inorder t) \ by(simp add: delete_def inorder_del inorder_paint) subsection \<open>Structural invariants\<close> subsubsection \<open>Update\<close> lemma invc_upd: assumes "invc t" shows "color t = Black \ using assms by (induct x y t rule: upd.induct) (auto simp: invc_baliL invc_baliR invc2I) lemma invh_upd: assumes "invh t" shows "invh (upd x y t)" "bheight (upd x y t) = bheight t" using assms by(induct x y t rule: upd.induct) (auto simp: invh_baliL invh_baliR bheight_baliL bheight_baliR) theorem rbt_update: "rbt t \ by (simp add: invc_upd(2) invh_upd(1) color_paint_Black invh_paint rbt_def update_def) subsubsection \<open>Deletion\<close> lemma del_invc_invh: "invh t \ (color t = Red \<and> bheight (del x t) = bheight t \<and> invc (del x t) \<or> color t = Black \<and> bheight (del x t) = bheight t - 1 \<and> invc2 (del x t))" proof (induct x t rule: del.induct) case (2 x _ ab c) have "x = fst ab \ thus ?case proof (elim disjE) assume "x = fst ab" with 2 show ?thesis by (cases c) (simp_all add: invh_join invc_join) next assume "x < fst ab" with 2 show ?thesis by(cases c) (auto simp: invh_baldL_invc invc_baldL invc2_baldL dest: neq_LeafD) next assume "fst ab < x" with 2 show ?thesis by(cases c) (auto simp: invh_baldR_invc invc_baldR invc2_baldR dest: neq_LeafD) qed qed auto theorem rbt_delete: "rbt t \ by (metis delete_def rbt_def color_paint_Black del_invc_invh invc2I invh_paint) interpretation M: Map_by_Ordered where empty = empty and lookup = lookup and update = update and delete = delete and inorder = inorder and inv = rbt proof (standard, goal_cases) case 1 show ?case by (simp add: empty_def) next case 2 thus ?case by(simp add: lookup_map_of) next case 3 thus ?case by(simp add: inorder_update) next case 4 thus ?case by(simp add: inorder_delete) next case 5 thus ?case by (simp add: rbt_def empty_def) next case 6 thus ?case by (simp add: rbt_update) next case 7 thus ?case by (simp add: rbt_delete) qed end ¤ Dauer der Verarbeitung: 0.15 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28