src/HOL/Data_Structures/Leftist_Heap.thy
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Mon, 14 Aug 2017 22:06:26 +0200
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separate file for priority queue interface; extended Leftist_Heap.
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(* Author: Tobias Nipkow *)
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section \<open>Leftist Heap\<close>
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theory Leftist_Heap
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imports
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  Tree2
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  Priority_Queue
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  Complex_Main
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begin
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(* FIXME mv Base *)
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lemma size_prod_measure[measure_function]: 
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  "is_measure f \<Longrightarrow> is_measure g \<Longrightarrow> is_measure (size_prod f g)"
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by (rule is_measure_trivial)
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fun mset_tree :: "('a,'b) tree \<Rightarrow> 'a multiset" where
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"mset_tree Leaf = {#}" |
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"mset_tree (Node _ l a r) = {#a#} + mset_tree l + mset_tree r"
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type_synonym 'a lheap = "('a,nat)tree"
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fun rank :: "'a lheap \<Rightarrow> nat" where
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"rank Leaf = 0" |
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"rank (Node _ _ _ r) = rank r + 1"
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fun rk :: "'a lheap \<Rightarrow> nat" where
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"rk Leaf = 0" |
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"rk (Node n _ _ _) = n"
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text{* The invariants: *}
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fun (in linorder) heap :: "('a,'b) tree \<Rightarrow> bool" where
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"heap Leaf = True" |
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"heap (Node _ l m r) =
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  (heap l \<and> heap r \<and> (\<forall>x \<in> set_mset(mset_tree l + mset_tree r). m \<le> x))"
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fun ltree :: "'a lheap \<Rightarrow> bool" where
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"ltree Leaf = True" |
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"ltree (Node n l a r) =
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 (n = rank r + 1 \<and> rank l \<ge> rank r \<and> ltree l & ltree r)"
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definition node :: "'a lheap \<Rightarrow> 'a \<Rightarrow> 'a lheap \<Rightarrow> 'a lheap" where
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"node l a r =
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 (let rl = rk l; rr = rk r
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  in if rl \<ge> rr then Node (rr+1) l a r else Node (rl+1) r a l)"
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fun get_min :: "'a lheap \<Rightarrow> 'a" where
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"get_min(Node n l a r) = a"
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fun merge :: "'a::ord lheap \<Rightarrow> 'a lheap \<Rightarrow> 'a lheap" where
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"merge Leaf t2 = t2" |
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"merge t1 Leaf = t1" |
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"merge (Node n1 l1 a1 r1) (Node n2 l2 a2 r2) =
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   (if a1 \<le> a2 then node l1 a1 (merge r1 (Node n2 l2 a2 r2))
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    else node l2 a2 (merge r2 (Node n1 l1 a1 r1)))"
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lemma merge_code: "merge t1 t2 = (case (t1,t2) of
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  (Leaf, _) \<Rightarrow> t2 |
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  (_, Leaf) \<Rightarrow> t1 |
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  (Node n1 l1 a1 r1, Node n2 l2 a2 r2) \<Rightarrow>
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    if a1 \<le> a2 then node l1 a1 (merge r1 t2) else node l2 a2 (merge r2 t1))"
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by(induction t1 t2 rule: merge.induct) (simp_all split: tree.split)
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definition insert :: "'a::ord \<Rightarrow> 'a lheap \<Rightarrow> 'a lheap" where
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"insert x t = merge (Node 1 Leaf x Leaf) t"
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fun del_min :: "'a::ord lheap \<Rightarrow> 'a lheap" where
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"del_min Leaf = Leaf" |
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"del_min (Node n l x r) = merge l r"
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subsection "Lemmas"
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(* FIXME mv DS_Base *)
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declare Let_def [simp]
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lemma mset_tree_empty: "mset_tree t = {#} \<longleftrightarrow> t = Leaf"
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by(cases t) auto
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lemma rk_eq_rank[simp]: "ltree t \<Longrightarrow> rk t = rank t"
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by(cases t) auto
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lemma ltree_node: "ltree (node l a r) \<longleftrightarrow> ltree l \<and> ltree r"
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by(auto simp add: node_def)
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lemma heap_node: "heap (node l a r) \<longleftrightarrow>
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  heap l \<and> heap r \<and> (\<forall>x \<in> set_mset(mset_tree l + mset_tree r). a \<le> x)"
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by(auto simp add: node_def)
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subsection "Functional Correctness"
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lemma mset_merge: "mset_tree (merge h1 h2) = mset_tree h1 + mset_tree h2"
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by (induction h1 h2 rule: merge.induct) (auto simp add: node_def ac_simps)
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lemma mset_insert: "mset_tree (insert x t) = mset_tree t + {#x#}"
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by (auto simp add: insert_def mset_merge)
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lemma get_min: "\<lbrakk> heap h;  h \<noteq> Leaf \<rbrakk> \<Longrightarrow> get_min h = Min_mset (mset_tree h)"
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by (induction h) (auto simp add:Min_mset_alt)
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lemma mset_del_min: "mset_tree (del_min h) = mset_tree h - {# get_min h #}"
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by (cases h) (auto simp: mset_merge)
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lemma ltree_merge: "\<lbrakk> ltree l; ltree r \<rbrakk> \<Longrightarrow> ltree (merge l r)"
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proof(induction l r rule: merge.induct)
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  case (3 n1 l1 a1 r1 n2 l2 a2 r2)
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  show ?case (is "ltree(merge ?t1 ?t2)")
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  proof cases
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    assume "a1 \<le> a2"
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    hence "ltree (merge ?t1 ?t2) = ltree (node l1 a1 (merge r1 ?t2))" by simp
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    also have "\<dots> = (ltree l1 \<and> ltree(merge r1 ?t2))"
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      by(simp add: ltree_node)
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    also have "..." using "3.prems" "3.IH"(1)[OF `a1 \<le> a2`] by (simp)
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    finally show ?thesis .
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  next (* analogous but automatic *)
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    assume "\<not> a1 \<le> a2"
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    thus ?thesis using 3 by(simp)(auto simp: ltree_node)
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  qed
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qed simp_all
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lemma heap_merge: "\<lbrakk> heap l; heap r \<rbrakk> \<Longrightarrow> heap (merge l r)"
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proof(induction l r rule: merge.induct)
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  case 3 thus ?case by(auto simp: heap_node mset_merge ball_Un)
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qed simp_all
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lemma ltree_insert: "ltree t \<Longrightarrow> ltree(insert x t)"
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by(simp add: insert_def ltree_merge del: merge.simps split: tree.split)
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lemma heap_insert: "heap t \<Longrightarrow> heap(insert x t)"
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by(simp add: insert_def heap_merge del: merge.simps split: tree.split)
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lemma ltree_del_min: "ltree t \<Longrightarrow> ltree(del_min t)"
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by(cases t)(auto simp add: ltree_merge simp del: merge.simps)
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lemma heap_del_min: "heap t \<Longrightarrow> heap(del_min t)"
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by(cases t)(auto simp add: heap_merge simp del: merge.simps)
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interpretation lheap: Priority_Queue
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where empty = Leaf and is_empty = "\<lambda>h. h = Leaf"
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and insert = insert and del_min = del_min
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and get_min = get_min and invar = "\<lambda>h. heap h \<and> ltree h"
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and mset = mset_tree
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proof(standard, goal_cases)
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  case 1 show ?case by simp
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next
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  case (2 q) show ?case by (cases q) auto
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next
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  case 3 show ?case by(rule mset_insert)
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next
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  case 4 show ?case by(rule mset_del_min)
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next
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  case 5 thus ?case by(simp add: get_min mset_tree_empty)
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next
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  case 6 thus ?case by(simp)
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next
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  case 7 thus ?case by(simp add: heap_insert ltree_insert)
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next
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  case 8 thus ?case by(simp add: heap_del_min ltree_del_min)
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qed
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subsection "Complexity"
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lemma pow2_rank_size1: "ltree t \<Longrightarrow> 2 ^ rank t \<le> size1 t"
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proof(induction t)
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  case Leaf show ?case by simp
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next
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  case (Node n l a r)
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  hence "rank r \<le> rank l" by simp
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  hence *: "(2::nat) ^ rank r \<le> 2 ^ rank l" by simp
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  have "(2::nat) ^ rank \<langle>n, l, a, r\<rangle> = 2 ^ rank r + 2 ^ rank r"
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    by(simp add: mult_2)
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  also have "\<dots> \<le> size1 l + size1 r"
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    using Node * by (simp del: power_increasing_iff)
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  also have "\<dots> = size1 \<langle>n, l, a, r\<rangle>" by simp
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  finally show ?case .
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qed
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fun t_merge :: "'a::ord lheap \<Rightarrow> 'a lheap \<Rightarrow> nat" where
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"t_merge Leaf t2 = 1" |
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"t_merge t2 Leaf = 1" |
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"t_merge (Node n1 l1 a1 r1) (Node n2 l2 a2 r2) =
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  (if a1 \<le> a2 then 1 + t_merge r1 (Node n2 l2 a2 r2)
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   else 1 + t_merge r2 (Node n1 l1 a1 r1))"
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definition t_insert :: "'a::ord \<Rightarrow> 'a lheap \<Rightarrow> nat" where
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"t_insert x t = t_merge (Node 1 Leaf x Leaf) t"
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fun t_del_min :: "'a::ord lheap \<Rightarrow> nat" where
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"t_del_min Leaf = 1" |
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"t_del_min (Node n l a r) = t_merge l r"
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lemma t_merge_rank: "t_merge l r \<le> rank l + rank r + 1"
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proof(induction l r rule: merge.induct)
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  case 3 thus ?case
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    by(simp)(fastforce split: tree.splits simp del: t_merge.simps)
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qed simp_all
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corollary t_merge_log: assumes "ltree l" "ltree r"
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  shows "t_merge l r \<le> log 2 (size1 l) + log 2 (size1 r) + 1"
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using le_log2_of_power[OF pow2_rank_size1[OF assms(1)]]
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  le_log2_of_power[OF pow2_rank_size1[OF assms(2)]] t_merge_rank[of l r]
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by linarith
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corollary t_insert_log: "ltree t \<Longrightarrow> t_insert x t \<le> log 2 (size1 t) + 2"
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using t_merge_log[of "Node 1 Leaf x Leaf" t]
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by(simp add: t_insert_def split: tree.split)
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(* FIXME mv Lemmas_log *)
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lemma ld_ld_1_less:
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  assumes "x > 0" "y > 0" shows "log 2 x + log 2 y + 1 < 2 * log 2 (x+y)"
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proof -
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  have "2 powr (log 2 x + log 2 y + 1) = 2*x*y"
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    using assms by(simp add: powr_add)
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  also have "\<dots> < (x+y)^2" using assms
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    by(simp add: numeral_eq_Suc algebra_simps add_pos_pos)
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  also have "\<dots> = 2 powr (2 * log 2 (x+y))"
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    using assms by(simp add: powr_add log_powr[symmetric] powr_numeral)
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  finally show ?thesis by simp
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qed
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corollary t_del_min_log: assumes "ltree t"
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  shows "t_del_min t \<le> 2 * log 2 (size1 t) + 1"
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proof(cases t)
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  case Leaf thus ?thesis using assms by simp
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next
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  case [simp]: (Node _ t1 _ t2)
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  have "t_del_min t = t_merge t1 t2" by simp
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  also have "\<dots> \<le> log 2 (size1 t1) + log 2 (size1 t2) + 1"
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    using \<open>ltree t\<close> by (auto simp: t_merge_log simp del: t_merge.simps)
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  also have "\<dots> \<le> 2 * log 2 (size1 t) + 1"
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    using ld_ld_1_less[of "size1 t1" "size1 t2"] by (simp)
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  finally show ?thesis .
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qed
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end