src/HOL/Library/Sublist.thy

--- /dev/null	Thu Jan 01 00:00:00 1970 +0000
+++ b/src/HOL/Library/Sublist.thy	Sat Jul 19 19:27:13 2008 +0200
@@ -0,0 +1,507 @@
+(* $Id$ *)
+
+header {* Slices of lists *}
+
+theory Sublist
+imports Multiset
+begin
+
+
+lemma sublist_split: "i \<le> j \<and> j \<le> k \<Longrightarrow> sublist xs {i..<j} @ sublist xs {j..<k} = sublist xs {i..<k}" 
+apply (induct xs arbitrary: i j k)
+apply simp
+apply (simp only: sublist_Cons)
+apply simp
+apply safe
+apply simp
+apply (erule_tac x="0" in meta_allE)
+apply (erule_tac x="j - 1" in meta_allE)
+apply (erule_tac x="k - 1" in meta_allE)
+apply (subgoal_tac "0 \<le> j - 1 \<and> j - 1 \<le> k - 1")
+apply simp
+apply (subgoal_tac "{ja. Suc ja < j} = {0..<j - Suc 0}")
+apply (subgoal_tac "{ja. j \<le> Suc ja \<and> Suc ja < k} = {j - Suc 0..<k - Suc 0}")
+apply (subgoal_tac "{j. Suc j < k} = {0..<k - Suc 0}")
+apply simp
+apply fastsimp
+apply fastsimp
+apply fastsimp
+apply fastsimp
+apply (erule_tac x="i - 1" in meta_allE)
+apply (erule_tac x="j - 1" in meta_allE)
+apply (erule_tac x="k - 1" in meta_allE)
+apply (subgoal_tac " {ja. i \<le> Suc ja \<and> Suc ja < j} = {i - 1 ..<j - 1}")
+apply (subgoal_tac " {ja. j \<le> Suc ja \<and> Suc ja < k} = {j - 1..<k - 1}")
+apply (subgoal_tac "{j. i \<le> Suc j \<and> Suc j < k} = {i - 1..<k - 1}")
+apply (subgoal_tac " i - 1 \<le> j - 1 \<and> j - 1 \<le> k - 1")
+apply simp
+apply fastsimp
+apply fastsimp
+apply fastsimp
+apply fastsimp
+done
+
+lemma sublist_update1: "i \<notin> inds \<Longrightarrow> sublist (xs[i := v]) inds = sublist xs inds"
+apply (induct xs arbitrary: i inds)
+apply simp
+apply (case_tac i)
+apply (simp add: sublist_Cons)
+apply (simp add: sublist_Cons)
+done
+
+lemma sublist_update2: "i \<in> inds \<Longrightarrow> sublist (xs[i := v]) inds = (sublist xs inds)[(card {k \<in> inds. k < i}):= v]"
+proof (induct xs arbitrary: i inds)
+  case Nil thus ?case by simp
+next
+  case (Cons x xs)
+  thus ?case
+  proof (cases i)
+    case 0 with Cons show ?thesis by (simp add: sublist_Cons)
+  next
+    case (Suc i')
+    with Cons show ?thesis
+      apply simp
+      apply (simp add: sublist_Cons)
+      apply auto
+      apply (auto simp add: nat.split)
+      apply (simp add: card_less)
+      apply (simp add: card_less)
+      apply (simp add: card_less_Suc[symmetric])
+      apply (simp add: card_less_Suc2)
+      done
+  qed
+qed
+
+lemma sublist_update: "sublist (xs[i := v]) inds = (if i \<in> inds then (sublist xs inds)[(card {k \<in> inds. k < i}) := v] else sublist xs inds)"
+by (simp add: sublist_update1 sublist_update2)
+
+lemma sublist_take: "sublist xs {j. j < m} = take m xs"
+apply (induct xs arbitrary: m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (simp add: sublist_Cons)
+done
+
+lemma sublist_take': "sublist xs {0..<m} = take m xs"
+apply (induct xs arbitrary: m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (simp add: sublist_Cons sublist_take)
+done
+
+lemma sublist_all[simp]: "sublist xs {j. j < length xs} = xs"
+apply (induct xs)
+apply simp
+apply (simp add: sublist_Cons)
+done
+
+lemma sublist_all'[simp]: "sublist xs {0..<length xs} = xs"
+apply (induct xs)
+apply simp
+apply (simp add: sublist_Cons)
+done
+
+lemma sublist_single: "a < length xs \<Longrightarrow> sublist xs {a} = [xs ! a]"
+apply (induct xs arbitrary: a)
+apply simp
+apply(case_tac aa)
+apply simp
+apply (simp add: sublist_Cons)
+apply simp
+apply (simp add: sublist_Cons)
+done
+
+lemma sublist_is_Nil: "\<forall>i \<in> inds. i \<ge> length xs \<Longrightarrow> sublist xs inds = []" 
+apply (induct xs arbitrary: inds)
+apply simp
+apply (simp add: sublist_Cons)
+apply auto
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply auto
+done
+
+lemma sublist_Nil': "sublist xs inds = [] \<Longrightarrow> \<forall>i \<in> inds. i \<ge> length xs"
+apply (induct xs arbitrary: inds)
+apply simp
+apply (simp add: sublist_Cons)
+apply (auto split: if_splits)
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply (case_tac x, auto)
+done
+
+lemma sublist_Nil[simp]: "(sublist xs inds = []) = (\<forall>i \<in> inds. i \<ge> length xs)"
+apply (induct xs arbitrary: inds)
+apply simp
+apply (simp add: sublist_Cons)
+apply auto
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply (case_tac x, auto)
+done
+
+lemma sublist_eq_subseteq: " \<lbrakk> inds' \<subseteq> inds; sublist xs inds = sublist ys inds \<rbrakk> \<Longrightarrow> sublist xs inds' = sublist ys inds'"
+apply (induct xs arbitrary: ys inds inds')
+apply simp
+apply (drule sym, rule sym)
+apply (simp add: sublist_Nil, fastsimp)
+apply (case_tac ys)
+apply (simp add: sublist_Nil, fastsimp)
+apply (auto simp add: sublist_Cons)
+apply (erule_tac x="list" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds'}" in meta_allE)
+apply fastsimp
+apply (erule_tac x="list" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds'}" in meta_allE)
+apply fastsimp
+done
+
+lemma sublist_eq: "\<lbrakk> \<forall>i \<in> inds. ((i < length xs) \<and> (i < length ys)) \<or> ((i \<ge> length xs ) \<and> (i \<ge> length ys)); \<forall>i \<in> inds. xs ! i = ys ! i \<rbrakk> \<Longrightarrow> sublist xs inds = sublist ys inds"
+apply (induct xs arbitrary: ys inds)
+apply simp
+apply (rule sym, simp add: sublist_Nil)
+apply (case_tac ys)
+apply (simp add: sublist_Nil)
+apply (auto simp add: sublist_Cons)
+apply (erule_tac x="list" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply fastsimp
+apply (erule_tac x="list" in meta_allE)
+apply (erule_tac x="{j. Suc j \<in> inds}" in meta_allE)
+apply fastsimp
+done
+
+lemma sublist_eq_samelength: "\<lbrakk> length xs = length ys; \<forall>i \<in> inds. xs ! i = ys ! i \<rbrakk> \<Longrightarrow> sublist xs inds = sublist ys inds"
+by (rule sublist_eq, auto)
+
+lemma sublist_eq_samelength_iff: "length xs = length ys \<Longrightarrow> (sublist xs inds = sublist ys inds) = (\<forall>i \<in> inds. xs ! i = ys ! i)"
+apply (induct xs arbitrary: ys inds)
+apply simp
+apply (rule sym, simp add: sublist_Nil)
+apply (case_tac ys)
+apply (simp add: sublist_Nil)
+apply (auto simp add: sublist_Cons)
+apply (case_tac i)
+apply auto
+apply (case_tac i)
+apply auto
+done
+
+section {* Another sublist function *}
+
+function sublist' :: "nat \<Rightarrow> nat \<Rightarrow> 'a list \<Rightarrow> 'a list"
+where
+  "sublist' n m [] = []"
+| "sublist' n 0 xs = []"
+| "sublist' 0 (Suc m) (x#xs) = (x#sublist' 0 m xs)"
+| "sublist' (Suc n) (Suc m) (x#xs) = sublist' n m xs"
+by pat_completeness auto
+termination by lexicographic_order
+
+subsection {* Proving equivalence to the other sublist command *}
+
+lemma sublist'_sublist: "sublist' n m xs = sublist xs {j. n \<le> j \<and> j < m}"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac n)
+apply (case_tac m)
+apply simp
+apply (simp add: sublist_Cons)
+apply (case_tac m)
+apply simp
+apply (simp add: sublist_Cons)
+done
+
+
+lemma "sublist' n m xs = sublist xs {n..<m}"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac n, case_tac m)
+apply simp
+apply simp
+apply (simp add: sublist_take')
+apply (case_tac m)
+apply simp
+apply (simp add: sublist_Cons sublist'_sublist)
+done
+
+
+subsection {* Showing equivalence to use of drop and take for definition *}
+
+lemma "sublist' n m xs = take (m - n) (drop n xs)"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (case_tac n)
+apply simp
+apply simp
+done
+
+subsection {* General lemma about sublist *}
+
+lemma sublist'_Nil[simp]: "sublist' i j [] = []"
+by simp
+
+lemma sublist'_Cons[simp]: "sublist' i (Suc j) (x#xs) = (case i of 0 \<Rightarrow> (x # sublist' 0 j xs) | Suc i' \<Rightarrow>  sublist' i' j xs)"
+by (cases i) auto
+
+lemma sublist'_Cons2[simp]: "sublist' i j (x#xs) = (if (j = 0) then [] else ((if (i = 0) then [x] else []) @ sublist' (i - 1) (j - 1) xs))"
+apply (cases j)
+apply auto
+apply (cases i)
+apply auto
+done
+
+lemma sublist_n_0: "sublist' n 0 xs = []"
+by (induct xs, auto)
+
+lemma sublist'_Nil': "n \<ge> m \<Longrightarrow> sublist' n m xs = []"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (case_tac n)
+apply simp
+apply simp
+done
+
+lemma sublist'_Nil2: "n \<ge> length xs \<Longrightarrow> sublist' n m xs = []"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (case_tac n)
+apply simp
+apply simp
+done
+
+lemma sublist'_Nil3: "(sublist' n m xs = []) = ((n \<ge> m) \<or> (n \<ge> length xs))"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (case_tac n)
+apply simp
+apply simp
+done
+
+lemma sublist'_notNil: "\<lbrakk> n < length xs; n < m \<rbrakk> \<Longrightarrow> sublist' n m xs \<noteq> []"
+apply (induct xs arbitrary: n m)
+apply simp
+apply (case_tac m)
+apply simp
+apply (case_tac n)
+apply simp
+apply simp
+done
+
+lemma sublist'_single: "n < length xs \<Longrightarrow> sublist' n (Suc n) xs = [xs ! n]"
+apply (induct xs arbitrary: n)
+apply simp
+apply simp
+apply (case_tac n)
+apply (simp add: sublist_n_0)
+apply simp
+done
+
+lemma sublist'_update1: "i \<ge> m \<Longrightarrow> sublist' n m (xs[i:=v]) = sublist' n m xs"
+apply (induct xs arbitrary: n m i)
+apply simp
+apply simp
+apply (case_tac i)
+apply simp
+apply simp
+done
+
+lemma sublist'_update2: "i < n \<Longrightarrow> sublist' n m (xs[i:=v]) = sublist' n m xs"
+apply (induct xs arbitrary: n m i)
+apply simp
+apply simp
+apply (case_tac i)
+apply simp
+apply simp
+done
+
+lemma sublist'_update3: "\<lbrakk>n \<le> i; i < m\<rbrakk> \<Longrightarrow> sublist' n m (xs[i := v]) = (sublist' n m xs)[i - n := v]"
+proof (induct xs arbitrary: n m i)
+  case Nil thus ?case by auto
+next
+  case (Cons x xs)
+  thus ?case
+    apply -
+    apply auto
+    apply (cases i)
+    apply auto
+    apply (cases i)
+    apply auto
+    done
+qed
+
+lemma "\<lbrakk> sublist' i j xs = sublist' i j ys; n \<ge> i; m \<le> j \<rbrakk> \<Longrightarrow> sublist' n m xs = sublist' n m ys"
+proof (induct xs arbitrary: i j ys n m)
+  case Nil
+  thus ?case
+    apply -
+    apply (rule sym, drule sym)
+    apply (simp add: sublist'_Nil)
+    apply (simp add: sublist'_Nil3)
+    apply arith
+    done
+next
+  case (Cons x xs i j ys n m)
+  note c = this
+  thus ?case
+  proof (cases m)
+    case 0 thus ?thesis by (simp add: sublist_n_0)
+  next
+    case (Suc m')
+    note a = this
+    thus ?thesis
+    proof (cases n)
+      case 0 note b = this
+      show ?thesis
+      proof (cases ys)
+	case Nil  with a b Cons.prems show ?thesis by (simp add: sublist'_Nil3)
+      next
+	case (Cons y ys)
+	show ?thesis
+	proof (cases j)
+	  case 0 with a b Cons.prems show ?thesis by simp
+	next
+	  case (Suc j') with a b Cons.prems Cons show ?thesis 
+	    apply -
+	    apply (simp, rule Cons.hyps [of "0" "j'" "ys" "0" "m'"], auto)
+	    done
+	qed
+      qed
+    next
+      case (Suc n')
+      show ?thesis
+      proof (cases ys)
+	case Nil with Suc a Cons.prems show ?thesis by (auto simp add: sublist'_Nil3)
+      next
+	case (Cons y ys) with Suc a Cons.prems show ?thesis
+	  apply -
+	  apply simp
+	  apply (cases j)
+	  apply simp
+	  apply (cases i)
+	  apply simp
+	  apply (rule_tac j="nat" in Cons.hyps [of "0" _ "ys" "n'" "m'"])
+	  apply simp
+	  apply simp
+	  apply simp
+	  apply simp
+	  apply (rule_tac i="nata" and j="nat" in Cons.hyps [of _ _ "ys" "n'" "m'"])
+	  apply simp
+	  apply simp
+	  apply simp
+	  done
+      qed
+    qed
+  qed
+qed
+
+lemma length_sublist': "j \<le> length xs \<Longrightarrow> length (sublist' i j xs) = j - i"
+by (induct xs arbitrary: i j, auto)
+
+lemma sublist'_front: "\<lbrakk> i < j; i < length xs \<rbrakk> \<Longrightarrow> sublist' i j xs = xs ! i # sublist' (Suc i) j xs"
+apply (induct xs arbitrary: a i j)
+apply simp
+apply (case_tac j)
+apply simp
+apply (case_tac i)
+apply simp
+apply simp
+done
+
+lemma sublist'_back: "\<lbrakk> i < j; j \<le> length xs \<rbrakk> \<Longrightarrow> sublist' i j xs = sublist' i (j - 1) xs @ [xs ! (j - 1)]"
+apply (induct xs arbitrary: a i j)
+apply simp
+apply simp
+apply (case_tac j)
+apply simp
+apply auto
+apply (case_tac nat)
+apply auto
+done
+
+(* suffices that j \<le> length xs and length ys *) 
+lemma sublist'_eq_samelength_iff: "length xs = length ys \<Longrightarrow> (sublist' i j xs  = sublist' i j ys) = (\<forall>i'. i \<le> i' \<and> i' < j \<longrightarrow> xs ! i' = ys ! i')"
+proof (induct xs arbitrary: ys i j)
+  case Nil thus ?case by simp
+next
+  case (Cons x xs)
+  thus ?case
+    apply -
+    apply (cases ys)
+    apply simp
+    apply simp
+    apply auto
+    apply (case_tac i', auto)
+    apply (erule_tac x="Suc i'" in allE, auto)
+    apply (erule_tac x="i' - 1" in allE, auto)
+    apply (case_tac i', auto)
+    apply (erule_tac x="Suc i'" in allE, auto)
+    done
+qed
+
+lemma sublist'_all[simp]: "sublist' 0 (length xs) xs = xs"
+by (induct xs, auto)
+
+lemma sublist'_sublist': "sublist' n m (sublist' i j xs) = sublist' (i + n) (min (i + m) j) xs" 
+by (induct xs arbitrary: i j n m) (auto simp add: min_diff)
+
+lemma sublist'_append: "\<lbrakk> i \<le> j; j \<le> k \<rbrakk> \<Longrightarrow>(sublist' i j xs) @ (sublist' j k xs) = sublist' i k xs"
+by (induct xs arbitrary: i j k) auto
+
+lemma nth_sublist': "\<lbrakk> k < j - i; j \<le> length xs \<rbrakk> \<Longrightarrow> (sublist' i j xs) ! k = xs ! (i + k)"
+apply (induct xs arbitrary: i j k)
+apply auto
+apply (case_tac k)
+apply auto
+apply (case_tac i)
+apply auto
+done
+
+lemma set_sublist': "set (sublist' i j xs) = {x. \<exists>k. i \<le> k \<and> k < j \<and> k < List.length xs \<and> x = xs ! k}"
+apply (simp add: sublist'_sublist)
+apply (simp add: set_sublist)
+apply auto
+done
+
+lemma all_in_set_sublist'_conv: "(\<forall>j. j \<in> set (sublist' l r xs) \<longrightarrow> P j) = (\<forall>k. l \<le> k \<and> k < r \<and> k < List.length xs \<longrightarrow> P (xs ! k))"
+unfolding set_sublist' by blast
+
+lemma ball_in_set_sublist'_conv: "(\<forall>j \<in> set (sublist' l r xs). P j) = (\<forall>k. l \<le> k \<and> k < r \<and> k < List.length xs \<longrightarrow> P (xs ! k))"
+unfolding set_sublist' by blast
+
+
+lemma multiset_of_sublist:
+assumes l_r: "l \<le> r \<and> r \<le> List.length xs"
+assumes left: "\<forall> i. i < l \<longrightarrow> (xs::'a list) ! i = ys ! i"
+assumes right: "\<forall> i. i \<ge> r \<longrightarrow> (xs::'a list) ! i = ys ! i"
+assumes multiset: "multiset_of xs = multiset_of ys"
+  shows "multiset_of (sublist' l r xs) = multiset_of (sublist' l r ys)"
+proof -
+  from l_r have xs_def: "xs = (sublist' 0 l xs) @ (sublist' l r xs) @ (sublist' r (List.length xs) xs)" (is "_ = ?xs_long") 
+    by (simp add: sublist'_append)
+  from multiset have length_eq: "List.length xs = List.length ys" by (rule multiset_of_eq_length)
+  with l_r have ys_def: "ys = (sublist' 0 l ys) @ (sublist' l r ys) @ (sublist' r (List.length ys) ys)" (is "_ = ?ys_long") 
+    by (simp add: sublist'_append)
+  from xs_def ys_def multiset have "multiset_of ?xs_long = multiset_of ?ys_long" by simp
+  moreover
+  from left l_r length_eq have "sublist' 0 l xs = sublist' 0 l ys"
+    by (auto simp add: length_sublist' nth_sublist' intro!: nth_equalityI)
+  moreover
+  from right l_r length_eq have "sublist' r (List.length xs) xs = sublist' r (List.length ys) ys"
+    by (auto simp add: length_sublist' nth_sublist' intro!: nth_equalityI)
+  moreover
+  ultimately show ?thesis by (simp add: multiset_of_append)
+qed
+
+
+end