src/HOL/Groups_Big.thy
author haftmann
Sun Mar 16 18:09:04 2014 +0100 (2014-03-16)
changeset 56166 9a241bc276cd
parent 55096 916b2ac758f4
child 56536 aefb4a8da31f
permissions -rw-r--r--
normalising simp rules for compound operators
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(*  Title:      HOL/Groups_Big.thy
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    Author:     Tobias Nipkow, Lawrence C Paulson and Markus Wenzel
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                with contributions by Jeremy Avigad
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*)
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header {* Big sum and product over finite (non-empty) sets *}
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theory Groups_Big
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imports Finite_Set
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begin
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subsection {* Generic monoid operation over a set *}
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no_notation times (infixl "*" 70)
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no_notation Groups.one ("1")
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locale comm_monoid_set = comm_monoid
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begin
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interpretation comp_fun_commute f
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  by default (simp add: fun_eq_iff left_commute)
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interpretation comp?: comp_fun_commute "f \<circ> g"
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  by (fact comp_comp_fun_commute)
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definition F :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b set \<Rightarrow> 'a"
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where
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  eq_fold: "F g A = Finite_Set.fold (f \<circ> g) 1 A"
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lemma infinite [simp]:
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  "\<not> finite A \<Longrightarrow> F g A = 1"
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  by (simp add: eq_fold)
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lemma empty [simp]:
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  "F g {} = 1"
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  by (simp add: eq_fold)
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lemma insert [simp]:
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  assumes "finite A" and "x \<notin> A"
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  shows "F g (insert x A) = g x * F g A"
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  using assms by (simp add: eq_fold)
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lemma remove:
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  assumes "finite A" and "x \<in> A"
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  shows "F g A = g x * F g (A - {x})"
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proof -
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  from `x \<in> A` obtain B where A: "A = insert x B" and "x \<notin> B"
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    by (auto dest: mk_disjoint_insert)
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  moreover from `finite A` A have "finite B" by simp
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  ultimately show ?thesis by simp
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qed
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lemma insert_remove:
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  assumes "finite A"
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  shows "F g (insert x A) = g x * F g (A - {x})"
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  using assms by (cases "x \<in> A") (simp_all add: remove insert_absorb)
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lemma neutral:
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  assumes "\<forall>x\<in>A. g x = 1"
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  shows "F g A = 1"
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  using assms by (induct A rule: infinite_finite_induct) simp_all
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lemma neutral_const [simp]:
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  "F (\<lambda>_. 1) A = 1"
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  by (simp add: neutral)
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lemma union_inter:
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  assumes "finite A" and "finite B"
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  shows "F g (A \<union> B) * F g (A \<inter> B) = F g A * F g B"
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  -- {* The reversed orientation looks more natural, but LOOPS as a simprule! *}
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using assms proof (induct A)
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  case empty then show ?case by simp
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next
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  case (insert x A) then show ?case
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    by (auto simp add: insert_absorb Int_insert_left commute [of _ "g x"] assoc left_commute)
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qed
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corollary union_inter_neutral:
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  assumes "finite A" and "finite B"
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  and I0: "\<forall>x \<in> A \<inter> B. g x = 1"
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  shows "F g (A \<union> B) = F g A * F g B"
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  using assms by (simp add: union_inter [symmetric] neutral)
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corollary union_disjoint:
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  assumes "finite A" and "finite B"
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  assumes "A \<inter> B = {}"
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  shows "F g (A \<union> B) = F g A * F g B"
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  using assms by (simp add: union_inter_neutral)
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lemma subset_diff:
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  assumes "B \<subseteq> A" and "finite A"
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  shows "F g A = F g (A - B) * F g B"
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proof -
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  from assms have "finite (A - B)" by auto
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  moreover from assms have "finite B" by (rule finite_subset)
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  moreover from assms have "(A - B) \<inter> B = {}" by auto
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  ultimately have "F g (A - B \<union> B) = F g (A - B) * F g B" by (rule union_disjoint)
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  moreover from assms have "A \<union> B = A" by auto
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  ultimately show ?thesis by simp
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qed
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lemma reindex:
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  assumes "inj_on h A"
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  shows "F g (h ` A) = F (g \<circ> h) A"
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proof (cases "finite A")
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  case True
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  with assms show ?thesis by (simp add: eq_fold fold_image comp_assoc)
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next
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  case False with assms have "\<not> finite (h ` A)" by (blast dest: finite_imageD)
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  with False show ?thesis by simp
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qed
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lemma cong:
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  assumes "A = B"
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  assumes g_h: "\<And>x. x \<in> B \<Longrightarrow> g x = h x"
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  shows "F g A = F h B"
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proof (cases "finite A")
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  case True
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  then have "\<And>C. C \<subseteq> A \<longrightarrow> (\<forall>x\<in>C. g x = h x) \<longrightarrow> F g C = F h C"
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  proof induct
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    case empty then show ?case by simp
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  next
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    case (insert x F) then show ?case apply -
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    apply (simp add: subset_insert_iff, clarify)
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    apply (subgoal_tac "finite C")
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      prefer 2 apply (blast dest: finite_subset [rotated])
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    apply (subgoal_tac "C = insert x (C - {x})")
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      prefer 2 apply blast
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    apply (erule ssubst)
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    apply (simp add: Ball_def del: insert_Diff_single)
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    done
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  qed
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  with `A = B` g_h show ?thesis by simp
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next
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  case False
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  with `A = B` show ?thesis by simp
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qed
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lemma strong_cong [cong]:
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  assumes "A = B" "\<And>x. x \<in> B =simp=> g x = h x"
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  shows "F (\<lambda>x. g x) A = F (\<lambda>x. h x) B"
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  by (rule cong) (insert assms, simp_all add: simp_implies_def)
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lemma UNION_disjoint:
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  assumes "finite I" and "\<forall>i\<in>I. finite (A i)"
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  and "\<forall>i\<in>I. \<forall>j\<in>I. i \<noteq> j \<longrightarrow> A i \<inter> A j = {}"
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  shows "F g (UNION I A) = F (\<lambda>x. F g (A x)) I"
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apply (insert assms)
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apply (induct rule: finite_induct)
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apply simp
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apply atomize
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apply (subgoal_tac "\<forall>i\<in>Fa. x \<noteq> i")
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 prefer 2 apply blast
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apply (subgoal_tac "A x Int UNION Fa A = {}")
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 prefer 2 apply blast
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apply (simp add: union_disjoint)
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done
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lemma Union_disjoint:
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  assumes "\<forall>A\<in>C. finite A" "\<forall>A\<in>C. \<forall>B\<in>C. A \<noteq> B \<longrightarrow> A \<inter> B = {}"
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  shows "F g (Union C) = F (F g) C"
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proof cases
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  assume "finite C"
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  from UNION_disjoint [OF this assms]
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  show ?thesis by simp
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qed (auto dest: finite_UnionD intro: infinite)
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lemma distrib:
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  "F (\<lambda>x. g x * h x) A = F g A * F h A"
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  using assms by (induct A rule: infinite_finite_induct) (simp_all add: assoc commute left_commute)
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lemma Sigma:
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  "finite A \<Longrightarrow> \<forall>x\<in>A. finite (B x) \<Longrightarrow> F (\<lambda>x. F (g x) (B x)) A = F (split g) (SIGMA x:A. B x)"
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apply (subst Sigma_def)
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apply (subst UNION_disjoint, assumption, simp)
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 apply blast
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apply (rule cong)
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apply rule
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apply (simp add: fun_eq_iff)
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apply (subst UNION_disjoint, simp, simp)
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 apply blast
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apply (simp add: comp_def)
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done
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lemma related: 
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  assumes Re: "R 1 1" 
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  and Rop: "\<forall>x1 y1 x2 y2. R x1 x2 \<and> R y1 y2 \<longrightarrow> R (x1 * y1) (x2 * y2)" 
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  and fS: "finite S" and Rfg: "\<forall>x\<in>S. R (h x) (g x)"
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  shows "R (F h S) (F g S)"
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  using fS by (rule finite_subset_induct) (insert assms, auto)
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lemma eq_general:
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  assumes h: "\<forall>y\<in>S'. \<exists>!x. x \<in> S \<and> h x = y" 
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  and f12:  "\<forall>x\<in>S. h x \<in> S' \<and> f2 (h x) = f1 x"
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  shows "F f1 S = F f2 S'"
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proof-
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  from h f12 have hS: "h ` S = S'" by blast
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  {fix x y assume H: "x \<in> S" "y \<in> S" "h x = h y"
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    from f12 h H  have "x = y" by auto }
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  hence hinj: "inj_on h S" unfolding inj_on_def Ex1_def by blast
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  from f12 have th: "\<And>x. x \<in> S \<Longrightarrow> (f2 \<circ> h) x = f1 x" by auto 
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  from hS have "F f2 S' = F f2 (h ` S)" by simp
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  also have "\<dots> = F (f2 o h) S" using reindex [OF hinj, of f2] .
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  also have "\<dots> = F f1 S " using th cong [of _ _ "f2 o h" f1]
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    by blast
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  finally show ?thesis ..
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qed
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lemma eq_general_reverses:
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  assumes kh: "\<And>y. y \<in> T \<Longrightarrow> k y \<in> S \<and> h (k y) = y"
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  and hk: "\<And>x. x \<in> S \<Longrightarrow> h x \<in> T \<and> k (h x) = x \<and> g (h x) = j x"
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  shows "F j S = F g T"
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  (* metis solves it, but not yet available here *)
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  apply (rule eq_general [of T S h g j])
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  apply (rule ballI)
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  apply (frule kh)
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  apply (rule ex1I[])
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  apply blast
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  apply clarsimp
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  apply (drule hk) apply simp
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  apply (rule sym)
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  apply (erule conjunct1[OF conjunct2[OF hk]])
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  apply (rule ballI)
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  apply (drule hk)
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  apply blast
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  done
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lemma mono_neutral_cong_left:
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  assumes "finite T" and "S \<subseteq> T" and "\<forall>i \<in> T - S. h i = 1"
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  and "\<And>x. x \<in> S \<Longrightarrow> g x = h x" shows "F g S = F h T"
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proof-
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  have eq: "T = S \<union> (T - S)" using `S \<subseteq> T` by blast
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  have d: "S \<inter> (T - S) = {}" using `S \<subseteq> T` by blast
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  from `finite T` `S \<subseteq> T` have f: "finite S" "finite (T - S)"
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    by (auto intro: finite_subset)
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  show ?thesis using assms(4)
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    by (simp add: union_disjoint [OF f d, unfolded eq [symmetric]] neutral [OF assms(3)])
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qed
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lemma mono_neutral_cong_right:
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  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. g i = 1; \<And>x. x \<in> S \<Longrightarrow> g x = h x \<rbrakk>
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   \<Longrightarrow> F g T = F h S"
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  by (auto intro!: mono_neutral_cong_left [symmetric])
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lemma mono_neutral_left:
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  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. g i = 1 \<rbrakk> \<Longrightarrow> F g S = F g T"
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  by (blast intro: mono_neutral_cong_left)
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lemma mono_neutral_right:
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  "\<lbrakk> finite T;  S \<subseteq> T;  \<forall>i \<in> T - S. g i = 1 \<rbrakk> \<Longrightarrow> F g T = F g S"
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  by (blast intro!: mono_neutral_left [symmetric])
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lemma delta: 
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  assumes fS: "finite S"
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  shows "F (\<lambda>k. if k = a then b k else 1) S = (if a \<in> S then b a else 1)"
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proof-
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  let ?f = "(\<lambda>k. if k=a then b k else 1)"
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  { assume a: "a \<notin> S"
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    hence "\<forall>k\<in>S. ?f k = 1" by simp
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    hence ?thesis  using a by simp }
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  moreover
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  { assume a: "a \<in> S"
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    let ?A = "S - {a}"
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    let ?B = "{a}"
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    have eq: "S = ?A \<union> ?B" using a by blast 
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    have dj: "?A \<inter> ?B = {}" by simp
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    from fS have fAB: "finite ?A" "finite ?B" by auto  
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    have "F ?f S = F ?f ?A * F ?f ?B"
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      using union_disjoint [OF fAB dj, of ?f, unfolded eq [symmetric]]
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      by simp
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    then have ?thesis using a by simp }
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  ultimately show ?thesis by blast
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qed
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lemma delta': 
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  assumes fS: "finite S"
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  shows "F (\<lambda>k. if a = k then b k else 1) S = (if a \<in> S then b a else 1)"
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  using delta [OF fS, of a b, symmetric] by (auto intro: cong)
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lemma If_cases:
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  fixes P :: "'b \<Rightarrow> bool" and g h :: "'b \<Rightarrow> 'a"
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  assumes fA: "finite A"
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  shows "F (\<lambda>x. if P x then h x else g x) A =
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    F h (A \<inter> {x. P x}) * F g (A \<inter> - {x. P x})"
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proof -
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  have a: "A = A \<inter> {x. P x} \<union> A \<inter> -{x. P x}" 
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          "(A \<inter> {x. P x}) \<inter> (A \<inter> -{x. P x}) = {}" 
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    by blast+
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  from fA 
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  have f: "finite (A \<inter> {x. P x})" "finite (A \<inter> -{x. P x})" by auto
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  let ?g = "\<lambda>x. if P x then h x else g x"
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  from union_disjoint [OF f a(2), of ?g] a(1)
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  show ?thesis
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    by (subst (1 2) cong) simp_all
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qed
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lemma cartesian_product:
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   "F (\<lambda>x. F (g x) B) A = F (split g) (A <*> B)"
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apply (rule sym)
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apply (cases "finite A") 
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 apply (cases "finite B") 
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  apply (simp add: Sigma)
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 apply (cases "A={}", simp)
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 apply simp
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apply (auto intro: infinite dest: finite_cartesian_productD2)
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apply (cases "B = {}") apply (auto intro: infinite dest: finite_cartesian_productD1)
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done
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   308
haftmann@54744
   309
end
haftmann@54744
   310
haftmann@54744
   311
notation times (infixl "*" 70)
haftmann@54744
   312
notation Groups.one ("1")
haftmann@54744
   313
haftmann@54744
   314
haftmann@54744
   315
subsection {* Generalized summation over a set *}
haftmann@54744
   316
haftmann@54744
   317
context comm_monoid_add
haftmann@54744
   318
begin
haftmann@54744
   319
haftmann@54744
   320
definition setsum :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b set \<Rightarrow> 'a"
haftmann@54744
   321
where
haftmann@54744
   322
  "setsum = comm_monoid_set.F plus 0"
haftmann@54744
   323
haftmann@54744
   324
sublocale setsum!: comm_monoid_set plus 0
haftmann@54744
   325
where
haftmann@54744
   326
  "comm_monoid_set.F plus 0 = setsum"
haftmann@54744
   327
proof -
haftmann@54744
   328
  show "comm_monoid_set plus 0" ..
haftmann@54744
   329
  then interpret setsum!: comm_monoid_set plus 0 .
haftmann@54744
   330
  from setsum_def show "comm_monoid_set.F plus 0 = setsum" by rule
haftmann@54744
   331
qed
haftmann@54744
   332
haftmann@54744
   333
abbreviation
haftmann@54744
   334
  Setsum ("\<Sum>_" [1000] 999) where
haftmann@54744
   335
  "\<Sum>A \<equiv> setsum (%x. x) A"
haftmann@54744
   336
haftmann@54744
   337
end
haftmann@54744
   338
haftmann@54744
   339
text{* Now: lot's of fancy syntax. First, @{term "setsum (%x. e) A"} is
haftmann@54744
   340
written @{text"\<Sum>x\<in>A. e"}. *}
haftmann@54744
   341
haftmann@54744
   342
syntax
haftmann@54744
   343
  "_setsum" :: "pttrn => 'a set => 'b => 'b::comm_monoid_add"    ("(3SUM _:_. _)" [0, 51, 10] 10)
haftmann@54744
   344
syntax (xsymbols)
haftmann@54744
   345
  "_setsum" :: "pttrn => 'a set => 'b => 'b::comm_monoid_add"    ("(3\<Sum>_\<in>_. _)" [0, 51, 10] 10)
haftmann@54744
   346
syntax (HTML output)
haftmann@54744
   347
  "_setsum" :: "pttrn => 'a set => 'b => 'b::comm_monoid_add"    ("(3\<Sum>_\<in>_. _)" [0, 51, 10] 10)
haftmann@54744
   348
haftmann@54744
   349
translations -- {* Beware of argument permutation! *}
haftmann@54744
   350
  "SUM i:A. b" == "CONST setsum (%i. b) A"
haftmann@54744
   351
  "\<Sum>i\<in>A. b" == "CONST setsum (%i. b) A"
haftmann@54744
   352
haftmann@54744
   353
text{* Instead of @{term"\<Sum>x\<in>{x. P}. e"} we introduce the shorter
haftmann@54744
   354
 @{text"\<Sum>x|P. e"}. *}
haftmann@54744
   355
haftmann@54744
   356
syntax
haftmann@54744
   357
  "_qsetsum" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3SUM _ |/ _./ _)" [0,0,10] 10)
haftmann@54744
   358
syntax (xsymbols)
haftmann@54744
   359
  "_qsetsum" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3\<Sum>_ | (_)./ _)" [0,0,10] 10)
haftmann@54744
   360
syntax (HTML output)
haftmann@54744
   361
  "_qsetsum" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3\<Sum>_ | (_)./ _)" [0,0,10] 10)
haftmann@54744
   362
haftmann@54744
   363
translations
haftmann@54744
   364
  "SUM x|P. t" => "CONST setsum (%x. t) {x. P}"
haftmann@54744
   365
  "\<Sum>x|P. t" => "CONST setsum (%x. t) {x. P}"
haftmann@54744
   366
haftmann@54744
   367
print_translation {*
haftmann@54744
   368
let
haftmann@54744
   369
  fun setsum_tr' [Abs (x, Tx, t), Const (@{const_syntax Collect}, _) $ Abs (y, Ty, P)] =
haftmann@54744
   370
        if x <> y then raise Match
haftmann@54744
   371
        else
haftmann@54744
   372
          let
haftmann@54744
   373
            val x' = Syntax_Trans.mark_bound_body (x, Tx);
haftmann@54744
   374
            val t' = subst_bound (x', t);
haftmann@54744
   375
            val P' = subst_bound (x', P);
haftmann@54744
   376
          in
haftmann@54744
   377
            Syntax.const @{syntax_const "_qsetsum"} $ Syntax_Trans.mark_bound_abs (x, Tx) $ P' $ t'
haftmann@54744
   378
          end
haftmann@54744
   379
    | setsum_tr' _ = raise Match;
haftmann@54744
   380
in [(@{const_syntax setsum}, K setsum_tr')] end
haftmann@54744
   381
*}
haftmann@54744
   382
haftmann@54744
   383
text {* TODO These are candidates for generalization *}
haftmann@54744
   384
haftmann@54744
   385
context comm_monoid_add
haftmann@54744
   386
begin
haftmann@54744
   387
haftmann@54744
   388
lemma setsum_reindex_id: 
haftmann@54744
   389
  "inj_on f B ==> setsum f B = setsum id (f ` B)"
haftmann@54744
   390
  by (simp add: setsum.reindex)
haftmann@54744
   391
haftmann@54744
   392
lemma setsum_reindex_nonzero:
haftmann@54744
   393
  assumes fS: "finite S"
haftmann@54744
   394
  and nz: "\<And>x y. x \<in> S \<Longrightarrow> y \<in> S \<Longrightarrow> x \<noteq> y \<Longrightarrow> f x = f y \<Longrightarrow> h (f x) = 0"
haftmann@54744
   395
  shows "setsum h (f ` S) = setsum (h \<circ> f) S"
haftmann@54744
   396
using nz proof (induct rule: finite_induct [OF fS])
haftmann@54744
   397
  case 1 thus ?case by simp
haftmann@54744
   398
next
haftmann@54744
   399
  case (2 x F) 
haftmann@54744
   400
  { assume fxF: "f x \<in> f ` F" hence "\<exists>y \<in> F . f y = f x" by auto
haftmann@54744
   401
    then obtain y where y: "y \<in> F" "f x = f y" by auto 
haftmann@54744
   402
    from "2.hyps" y have xy: "x \<noteq> y" by auto
haftmann@54744
   403
    from "2.prems" [of x y] "2.hyps" xy y have h0: "h (f x) = 0" by simp
haftmann@54744
   404
    have "setsum h (f ` insert x F) = setsum h (f ` F)" using fxF by auto
haftmann@54744
   405
    also have "\<dots> = setsum (h o f) (insert x F)" 
haftmann@54744
   406
      unfolding setsum.insert[OF `finite F` `x\<notin>F`]
haftmann@54744
   407
      using h0
haftmann@54744
   408
      apply (simp cong del: setsum.strong_cong)
haftmann@54744
   409
      apply (rule "2.hyps"(3))
haftmann@54744
   410
      apply (rule_tac y="y" in  "2.prems")
haftmann@54744
   411
      apply simp_all
haftmann@54744
   412
      done
haftmann@54744
   413
    finally have ?case . }
haftmann@54744
   414
  moreover
haftmann@54744
   415
  { assume fxF: "f x \<notin> f ` F"
haftmann@54744
   416
    have "setsum h (f ` insert x F) = h (f x) + setsum h (f ` F)" 
haftmann@54744
   417
      using fxF "2.hyps" by simp 
haftmann@54744
   418
    also have "\<dots> = setsum (h o f) (insert x F)"
haftmann@54744
   419
      unfolding setsum.insert[OF `finite F` `x\<notin>F`]
haftmann@54744
   420
      apply (simp cong del: setsum.strong_cong)
haftmann@54744
   421
      apply (rule cong [OF refl [of "op + (h (f x))"]])
haftmann@54744
   422
      apply (rule "2.hyps"(3))
haftmann@54744
   423
      apply (rule_tac y="y" in  "2.prems")
haftmann@54744
   424
      apply simp_all
haftmann@54744
   425
      done
haftmann@54744
   426
    finally have ?case . }
haftmann@54744
   427
  ultimately show ?case by blast
haftmann@54744
   428
qed
haftmann@54744
   429
haftmann@54744
   430
lemma setsum_cong2:
haftmann@54744
   431
  "(\<And>x. x \<in> A \<Longrightarrow> f x = g x) \<Longrightarrow> setsum f A = setsum g A"
haftmann@54744
   432
  by (auto intro: setsum.cong)
haftmann@54744
   433
haftmann@54744
   434
lemma setsum_reindex_cong:
haftmann@54744
   435
   "[|inj_on f A; B = f ` A; !!a. a:A \<Longrightarrow> g a = h (f a)|] 
haftmann@54744
   436
    ==> setsum h B = setsum g A"
haftmann@54744
   437
  by (simp add: setsum.reindex)
haftmann@54744
   438
haftmann@54744
   439
lemma setsum_restrict_set:
haftmann@54744
   440
  assumes fA: "finite A"
haftmann@54744
   441
  shows "setsum f (A \<inter> B) = setsum (\<lambda>x. if x \<in> B then f x else 0) A"
haftmann@54744
   442
proof-
haftmann@54744
   443
  from fA have fab: "finite (A \<inter> B)" by auto
haftmann@54744
   444
  have aba: "A \<inter> B \<subseteq> A" by blast
haftmann@54744
   445
  let ?g = "\<lambda>x. if x \<in> A\<inter>B then f x else 0"
haftmann@54744
   446
  from setsum.mono_neutral_left [OF fA aba, of ?g]
haftmann@54744
   447
  show ?thesis by simp
haftmann@54744
   448
qed
haftmann@54744
   449
haftmann@54744
   450
lemma setsum_Union_disjoint:
haftmann@54744
   451
  assumes "\<forall>A\<in>C. finite A" "\<forall>A\<in>C. \<forall>B\<in>C. A \<noteq> B \<longrightarrow> A Int B = {}"
haftmann@54744
   452
  shows "setsum f (Union C) = setsum (setsum f) C"
haftmann@54744
   453
  using assms by (fact setsum.Union_disjoint)
haftmann@54744
   454
haftmann@54744
   455
lemma setsum_cartesian_product:
haftmann@54744
   456
  "(\<Sum>x\<in>A. (\<Sum>y\<in>B. f x y)) = (\<Sum>(x,y) \<in> A <*> B. f x y)"
haftmann@54744
   457
  by (fact setsum.cartesian_product)
haftmann@54744
   458
haftmann@54744
   459
lemma setsum_UNION_zero:
haftmann@54744
   460
  assumes fS: "finite S" and fSS: "\<forall>T \<in> S. finite T"
haftmann@54744
   461
  and f0: "\<And>T1 T2 x. T1\<in>S \<Longrightarrow> T2\<in>S \<Longrightarrow> T1 \<noteq> T2 \<Longrightarrow> x \<in> T1 \<Longrightarrow> x \<in> T2 \<Longrightarrow> f x = 0"
haftmann@54744
   462
  shows "setsum f (\<Union>S) = setsum (\<lambda>T. setsum f T) S"
haftmann@54744
   463
  using fSS f0
haftmann@54744
   464
proof(induct rule: finite_induct[OF fS])
haftmann@54744
   465
  case 1 thus ?case by simp
haftmann@54744
   466
next
haftmann@54744
   467
  case (2 T F)
haftmann@54744
   468
  then have fTF: "finite T" "\<forall>T\<in>F. finite T" "finite F" and TF: "T \<notin> F" 
haftmann@54744
   469
    and H: "setsum f (\<Union> F) = setsum (setsum f) F" by auto
haftmann@54744
   470
  from fTF have fUF: "finite (\<Union>F)" by auto
haftmann@54744
   471
  from "2.prems" TF fTF
haftmann@54744
   472
  show ?case 
haftmann@54744
   473
    by (auto simp add: H [symmetric] intro: setsum.union_inter_neutral [OF fTF(1) fUF, of f])
haftmann@54744
   474
qed
haftmann@54744
   475
haftmann@54744
   476
text {* Commuting outer and inner summation *}
haftmann@54744
   477
haftmann@54744
   478
lemma setsum_commute:
haftmann@54744
   479
  "(\<Sum>i\<in>A. \<Sum>j\<in>B. f i j) = (\<Sum>j\<in>B. \<Sum>i\<in>A. f i j)"
haftmann@54744
   480
proof (simp add: setsum_cartesian_product)
haftmann@54744
   481
  have "(\<Sum>(x,y) \<in> A <*> B. f x y) =
haftmann@54744
   482
    (\<Sum>(y,x) \<in> (%(i, j). (j, i)) ` (A \<times> B). f x y)"
haftmann@54744
   483
    (is "?s = _")
haftmann@54744
   484
    apply (simp add: setsum.reindex [where h = "%(i, j). (j, i)"] swap_inj_on)
haftmann@54744
   485
    apply (simp add: split_def)
haftmann@54744
   486
    done
haftmann@54744
   487
  also have "... = (\<Sum>(y,x)\<in>B \<times> A. f x y)"
haftmann@54744
   488
    (is "_ = ?t")
haftmann@54744
   489
    apply (simp add: swap_product)
haftmann@54744
   490
    done
haftmann@54744
   491
  finally show "?s = ?t" .
haftmann@54744
   492
qed
haftmann@54744
   493
haftmann@54744
   494
lemma setsum_Plus:
haftmann@54744
   495
  fixes A :: "'a set" and B :: "'b set"
haftmann@54744
   496
  assumes fin: "finite A" "finite B"
haftmann@54744
   497
  shows "setsum f (A <+> B) = setsum (f \<circ> Inl) A + setsum (f \<circ> Inr) B"
haftmann@54744
   498
proof -
haftmann@54744
   499
  have "A <+> B = Inl ` A \<union> Inr ` B" by auto
haftmann@54744
   500
  moreover from fin have "finite (Inl ` A :: ('a + 'b) set)" "finite (Inr ` B :: ('a + 'b) set)"
haftmann@54744
   501
    by auto
haftmann@54744
   502
  moreover have "Inl ` A \<inter> Inr ` B = ({} :: ('a + 'b) set)" by auto
haftmann@54744
   503
  moreover have "inj_on (Inl :: 'a \<Rightarrow> 'a + 'b) A" "inj_on (Inr :: 'b \<Rightarrow> 'a + 'b) B" by(auto intro: inj_onI)
haftmann@54744
   504
  ultimately show ?thesis using fin by(simp add: setsum.union_disjoint setsum.reindex)
haftmann@54744
   505
qed
haftmann@54744
   506
haftmann@54744
   507
end
haftmann@54744
   508
haftmann@54744
   509
text {* TODO These are legacy *}
haftmann@54744
   510
haftmann@54744
   511
lemma setsum_empty:
haftmann@54744
   512
  "setsum f {} = 0"
haftmann@54744
   513
  by (fact setsum.empty)
haftmann@54744
   514
haftmann@54744
   515
lemma setsum_insert:
haftmann@54744
   516
  "finite F ==> a \<notin> F ==> setsum f (insert a F) = f a + setsum f F"
haftmann@54744
   517
  by (fact setsum.insert)
haftmann@54744
   518
haftmann@54744
   519
lemma setsum_infinite:
haftmann@54744
   520
  "~ finite A ==> setsum f A = 0"
haftmann@54744
   521
  by (fact setsum.infinite)
haftmann@54744
   522
haftmann@54744
   523
lemma setsum_reindex:
haftmann@54744
   524
  "inj_on f B \<Longrightarrow> setsum h (f ` B) = setsum (h \<circ> f) B"
haftmann@54744
   525
  by (fact setsum.reindex)
haftmann@54744
   526
haftmann@54744
   527
lemma setsum_cong:
haftmann@54744
   528
  "A = B ==> (!!x. x:B ==> f x = g x) ==> setsum f A = setsum g B"
haftmann@54744
   529
  by (fact setsum.cong)
haftmann@54744
   530
haftmann@54744
   531
lemma strong_setsum_cong:
haftmann@54744
   532
  "A = B ==> (!!x. x:B =simp=> f x = g x)
haftmann@54744
   533
   ==> setsum (%x. f x) A = setsum (%x. g x) B"
haftmann@54744
   534
  by (fact setsum.strong_cong)
haftmann@54744
   535
haftmann@54744
   536
lemmas setsum_0 = setsum.neutral_const
haftmann@54744
   537
lemmas setsum_0' = setsum.neutral
haftmann@54744
   538
haftmann@54744
   539
lemma setsum_Un_Int: "finite A ==> finite B ==>
haftmann@54744
   540
  setsum g (A Un B) + setsum g (A Int B) = setsum g A + setsum g B"
haftmann@54744
   541
  -- {* The reversed orientation looks more natural, but LOOPS as a simprule! *}
haftmann@54744
   542
  by (fact setsum.union_inter)
haftmann@54744
   543
haftmann@54744
   544
lemma setsum_Un_disjoint: "finite A ==> finite B
haftmann@54744
   545
  ==> A Int B = {} ==> setsum g (A Un B) = setsum g A + setsum g B"
haftmann@54744
   546
  by (fact setsum.union_disjoint)
haftmann@54744
   547
haftmann@54744
   548
lemma setsum_subset_diff: "\<lbrakk> B \<subseteq> A; finite A \<rbrakk> \<Longrightarrow>
haftmann@54744
   549
    setsum f A = setsum f (A - B) + setsum f B"
haftmann@54744
   550
  by (fact setsum.subset_diff)
haftmann@54744
   551
haftmann@54744
   552
lemma setsum_mono_zero_left: 
haftmann@54744
   553
  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. f i = 0 \<rbrakk> \<Longrightarrow> setsum f S = setsum f T"
haftmann@54744
   554
  by (fact setsum.mono_neutral_left)
haftmann@54744
   555
haftmann@54744
   556
lemmas setsum_mono_zero_right = setsum.mono_neutral_right
haftmann@54744
   557
haftmann@54744
   558
lemma setsum_mono_zero_cong_left: 
haftmann@54744
   559
  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. g i = 0; \<And>x. x \<in> S \<Longrightarrow> f x = g x \<rbrakk>
haftmann@54744
   560
  \<Longrightarrow> setsum f S = setsum g T"
haftmann@54744
   561
  by (fact setsum.mono_neutral_cong_left)
haftmann@54744
   562
haftmann@54744
   563
lemmas setsum_mono_zero_cong_right = setsum.mono_neutral_cong_right
haftmann@54744
   564
haftmann@54744
   565
lemma setsum_delta: "finite S \<Longrightarrow>
haftmann@54744
   566
  setsum (\<lambda>k. if k=a then b k else 0) S = (if a \<in> S then b a else 0)"
haftmann@54744
   567
  by (fact setsum.delta)
haftmann@54744
   568
haftmann@54744
   569
lemma setsum_delta': "finite S \<Longrightarrow>
haftmann@54744
   570
  setsum (\<lambda>k. if a = k then b k else 0) S = (if a\<in> S then b a else 0)"
haftmann@54744
   571
  by (fact setsum.delta')
haftmann@54744
   572
haftmann@54744
   573
lemma setsum_cases:
haftmann@54744
   574
  assumes "finite A"
haftmann@54744
   575
  shows "setsum (\<lambda>x. if P x then f x else g x) A =
haftmann@54744
   576
         setsum f (A \<inter> {x. P x}) + setsum g (A \<inter> - {x. P x})"
haftmann@54744
   577
  using assms by (fact setsum.If_cases)
haftmann@54744
   578
haftmann@54744
   579
(*But we can't get rid of finite I. If infinite, although the rhs is 0, 
haftmann@54744
   580
  the lhs need not be, since UNION I A could still be finite.*)
haftmann@54744
   581
lemma setsum_UN_disjoint:
haftmann@54744
   582
  assumes "finite I" and "ALL i:I. finite (A i)"
haftmann@54744
   583
    and "ALL i:I. ALL j:I. i \<noteq> j --> A i Int A j = {}"
haftmann@54744
   584
  shows "setsum f (UNION I A) = (\<Sum>i\<in>I. setsum f (A i))"
haftmann@54744
   585
  using assms by (fact setsum.UNION_disjoint)
haftmann@54744
   586
haftmann@54744
   587
(*But we can't get rid of finite A. If infinite, although the lhs is 0, 
haftmann@54744
   588
  the rhs need not be, since SIGMA A B could still be finite.*)
haftmann@54744
   589
lemma setsum_Sigma:
haftmann@54744
   590
  assumes "finite A" and  "ALL x:A. finite (B x)"
haftmann@54744
   591
  shows "(\<Sum>x\<in>A. (\<Sum>y\<in>B x. f x y)) = (\<Sum>(x,y)\<in>(SIGMA x:A. B x). f x y)"
haftmann@54744
   592
  using assms by (fact setsum.Sigma)
haftmann@54744
   593
haftmann@54744
   594
lemma setsum_addf: "setsum (%x. f x + g x) A = (setsum f A + setsum g A)"
haftmann@54744
   595
  by (fact setsum.distrib)
haftmann@54744
   596
haftmann@54744
   597
lemma setsum_Un_zero:  
haftmann@54744
   598
  "\<lbrakk> finite S; finite T; \<forall>x \<in> S\<inter>T. f x = 0 \<rbrakk> \<Longrightarrow>
haftmann@54744
   599
  setsum f (S \<union> T) = setsum f S + setsum f T"
haftmann@54744
   600
  by (fact setsum.union_inter_neutral)
haftmann@54744
   601
haftmann@54744
   602
lemma setsum_eq_general_reverses:
haftmann@54744
   603
  assumes fS: "finite S" and fT: "finite T"
haftmann@54744
   604
  and kh: "\<And>y. y \<in> T \<Longrightarrow> k y \<in> S \<and> h (k y) = y"
haftmann@54744
   605
  and hk: "\<And>x. x \<in> S \<Longrightarrow> h x \<in> T \<and> k (h x) = x \<and> g (h x) = f x"
haftmann@54744
   606
  shows "setsum f S = setsum g T"
haftmann@54744
   607
  using kh hk by (fact setsum.eq_general_reverses)
haftmann@54744
   608
haftmann@54744
   609
haftmann@54744
   610
subsubsection {* Properties in more restricted classes of structures *}
haftmann@54744
   611
haftmann@54744
   612
lemma setsum_Un: "finite A ==> finite B ==>
haftmann@54744
   613
  (setsum f (A Un B) :: 'a :: ab_group_add) =
haftmann@54744
   614
   setsum f A + setsum f B - setsum f (A Int B)"
haftmann@54744
   615
by (subst setsum_Un_Int [symmetric], auto simp add: algebra_simps)
haftmann@54744
   616
haftmann@54744
   617
lemma setsum_Un2:
haftmann@54744
   618
  assumes "finite (A \<union> B)"
haftmann@54744
   619
  shows "setsum f (A \<union> B) = setsum f (A - B) + setsum f (B - A) + setsum f (A \<inter> B)"
haftmann@54744
   620
proof -
haftmann@54744
   621
  have "A \<union> B = A - B \<union> (B - A) \<union> A \<inter> B"
haftmann@54744
   622
    by auto
haftmann@54744
   623
  with assms show ?thesis by simp (subst setsum_Un_disjoint, auto)+
haftmann@54744
   624
qed
haftmann@54744
   625
haftmann@54744
   626
lemma setsum_diff1: "finite A \<Longrightarrow>
haftmann@54744
   627
  (setsum f (A - {a}) :: ('a::ab_group_add)) =
haftmann@54744
   628
  (if a:A then setsum f A - f a else setsum f A)"
haftmann@54744
   629
by (erule finite_induct) (auto simp add: insert_Diff_if)
haftmann@54744
   630
haftmann@54744
   631
lemma setsum_diff:
haftmann@54744
   632
  assumes le: "finite A" "B \<subseteq> A"
haftmann@54744
   633
  shows "setsum f (A - B) = setsum f A - ((setsum f B)::('a::ab_group_add))"
haftmann@54744
   634
proof -
haftmann@54744
   635
  from le have finiteB: "finite B" using finite_subset by auto
haftmann@54744
   636
  show ?thesis using finiteB le
haftmann@54744
   637
  proof induct
haftmann@54744
   638
    case empty
haftmann@54744
   639
    thus ?case by auto
haftmann@54744
   640
  next
haftmann@54744
   641
    case (insert x F)
haftmann@54744
   642
    thus ?case using le finiteB 
haftmann@54744
   643
      by (simp add: Diff_insert[where a=x and B=F] setsum_diff1 insert_absorb)
haftmann@54744
   644
  qed
haftmann@54744
   645
qed
haftmann@54744
   646
haftmann@54744
   647
lemma setsum_mono:
haftmann@54744
   648
  assumes le: "\<And>i. i\<in>K \<Longrightarrow> f (i::'a) \<le> ((g i)::('b::{comm_monoid_add, ordered_ab_semigroup_add}))"
haftmann@54744
   649
  shows "(\<Sum>i\<in>K. f i) \<le> (\<Sum>i\<in>K. g i)"
haftmann@54744
   650
proof (cases "finite K")
haftmann@54744
   651
  case True
haftmann@54744
   652
  thus ?thesis using le
haftmann@54744
   653
  proof induct
haftmann@54744
   654
    case empty
haftmann@54744
   655
    thus ?case by simp
haftmann@54744
   656
  next
haftmann@54744
   657
    case insert
haftmann@54744
   658
    thus ?case using add_mono by fastforce
haftmann@54744
   659
  qed
haftmann@54744
   660
next
haftmann@54744
   661
  case False then show ?thesis by simp
haftmann@54744
   662
qed
haftmann@54744
   663
haftmann@54744
   664
lemma setsum_strict_mono:
haftmann@54744
   665
  fixes f :: "'a \<Rightarrow> 'b::{ordered_cancel_ab_semigroup_add,comm_monoid_add}"
haftmann@54744
   666
  assumes "finite A"  "A \<noteq> {}"
haftmann@54744
   667
    and "!!x. x:A \<Longrightarrow> f x < g x"
haftmann@54744
   668
  shows "setsum f A < setsum g A"
haftmann@54744
   669
  using assms
haftmann@54744
   670
proof (induct rule: finite_ne_induct)
haftmann@54744
   671
  case singleton thus ?case by simp
haftmann@54744
   672
next
haftmann@54744
   673
  case insert thus ?case by (auto simp: add_strict_mono)
haftmann@54744
   674
qed
haftmann@54744
   675
haftmann@54744
   676
lemma setsum_strict_mono_ex1:
haftmann@54744
   677
fixes f :: "'a \<Rightarrow> 'b::{comm_monoid_add, ordered_cancel_ab_semigroup_add}"
haftmann@54744
   678
assumes "finite A" and "ALL x:A. f x \<le> g x" and "EX a:A. f a < g a"
haftmann@54744
   679
shows "setsum f A < setsum g A"
haftmann@54744
   680
proof-
haftmann@54744
   681
  from assms(3) obtain a where a: "a:A" "f a < g a" by blast
haftmann@54744
   682
  have "setsum f A = setsum f ((A-{a}) \<union> {a})"
haftmann@54744
   683
    by(simp add:insert_absorb[OF `a:A`])
haftmann@54744
   684
  also have "\<dots> = setsum f (A-{a}) + setsum f {a}"
haftmann@54744
   685
    using `finite A` by(subst setsum_Un_disjoint) auto
haftmann@54744
   686
  also have "setsum f (A-{a}) \<le> setsum g (A-{a})"
haftmann@54744
   687
    by(rule setsum_mono)(simp add: assms(2))
haftmann@54744
   688
  also have "setsum f {a} < setsum g {a}" using a by simp
haftmann@54744
   689
  also have "setsum g (A - {a}) + setsum g {a} = setsum g((A-{a}) \<union> {a})"
haftmann@54744
   690
    using `finite A` by(subst setsum_Un_disjoint[symmetric]) auto
haftmann@54744
   691
  also have "\<dots> = setsum g A" by(simp add:insert_absorb[OF `a:A`])
haftmann@54744
   692
  finally show ?thesis by (auto simp add: add_right_mono add_strict_left_mono)
haftmann@54744
   693
qed
haftmann@54744
   694
haftmann@54744
   695
lemma setsum_negf:
haftmann@54744
   696
  "setsum (%x. - (f x)::'a::ab_group_add) A = - setsum f A"
haftmann@54744
   697
proof (cases "finite A")
haftmann@54744
   698
  case True thus ?thesis by (induct set: finite) auto
haftmann@54744
   699
next
haftmann@54744
   700
  case False thus ?thesis by simp
haftmann@54744
   701
qed
haftmann@54744
   702
haftmann@54744
   703
lemma setsum_subtractf:
haftmann@54744
   704
  "setsum (%x. ((f x)::'a::ab_group_add) - g x) A =
haftmann@54744
   705
    setsum f A - setsum g A"
haftmann@54744
   706
  using setsum_addf [of f "- g" A] by (simp add: setsum_negf)
haftmann@54744
   707
haftmann@54744
   708
lemma setsum_nonneg:
haftmann@54744
   709
  assumes nn: "\<forall>x\<in>A. (0::'a::{ordered_ab_semigroup_add,comm_monoid_add}) \<le> f x"
haftmann@54744
   710
  shows "0 \<le> setsum f A"
haftmann@54744
   711
proof (cases "finite A")
haftmann@54744
   712
  case True thus ?thesis using nn
haftmann@54744
   713
  proof induct
haftmann@54744
   714
    case empty then show ?case by simp
haftmann@54744
   715
  next
haftmann@54744
   716
    case (insert x F)
haftmann@54744
   717
    then have "0 + 0 \<le> f x + setsum f F" by (blast intro: add_mono)
haftmann@54744
   718
    with insert show ?case by simp
haftmann@54744
   719
  qed
haftmann@54744
   720
next
haftmann@54744
   721
  case False thus ?thesis by simp
haftmann@54744
   722
qed
haftmann@54744
   723
haftmann@54744
   724
lemma setsum_nonpos:
haftmann@54744
   725
  assumes np: "\<forall>x\<in>A. f x \<le> (0::'a::{ordered_ab_semigroup_add,comm_monoid_add})"
haftmann@54744
   726
  shows "setsum f A \<le> 0"
haftmann@54744
   727
proof (cases "finite A")
haftmann@54744
   728
  case True thus ?thesis using np
haftmann@54744
   729
  proof induct
haftmann@54744
   730
    case empty then show ?case by simp
haftmann@54744
   731
  next
haftmann@54744
   732
    case (insert x F)
haftmann@54744
   733
    then have "f x + setsum f F \<le> 0 + 0" by (blast intro: add_mono)
haftmann@54744
   734
    with insert show ?case by simp
haftmann@54744
   735
  qed
haftmann@54744
   736
next
haftmann@54744
   737
  case False thus ?thesis by simp
haftmann@54744
   738
qed
haftmann@54744
   739
haftmann@54744
   740
lemma setsum_nonneg_leq_bound:
haftmann@54744
   741
  fixes f :: "'a \<Rightarrow> 'b::{ordered_ab_group_add}"
haftmann@54744
   742
  assumes "finite s" "\<And>i. i \<in> s \<Longrightarrow> f i \<ge> 0" "(\<Sum>i \<in> s. f i) = B" "i \<in> s"
haftmann@54744
   743
  shows "f i \<le> B"
haftmann@54744
   744
proof -
haftmann@54744
   745
  have "0 \<le> (\<Sum> i \<in> s - {i}. f i)" and "0 \<le> f i"
haftmann@54744
   746
    using assms by (auto intro!: setsum_nonneg)
haftmann@54744
   747
  moreover
haftmann@54744
   748
  have "(\<Sum> i \<in> s - {i}. f i) + f i = B"
haftmann@54744
   749
    using assms by (simp add: setsum_diff1)
haftmann@54744
   750
  ultimately show ?thesis by auto
haftmann@54744
   751
qed
haftmann@54744
   752
haftmann@54744
   753
lemma setsum_nonneg_0:
haftmann@54744
   754
  fixes f :: "'a \<Rightarrow> 'b::{ordered_ab_group_add}"
haftmann@54744
   755
  assumes "finite s" and pos: "\<And> i. i \<in> s \<Longrightarrow> f i \<ge> 0"
haftmann@54744
   756
  and "(\<Sum> i \<in> s. f i) = 0" and i: "i \<in> s"
haftmann@54744
   757
  shows "f i = 0"
haftmann@54744
   758
  using setsum_nonneg_leq_bound[OF assms] pos[OF i] by auto
haftmann@54744
   759
haftmann@54744
   760
lemma setsum_mono2:
haftmann@54744
   761
fixes f :: "'a \<Rightarrow> 'b :: ordered_comm_monoid_add"
haftmann@54744
   762
assumes fin: "finite B" and sub: "A \<subseteq> B" and nn: "\<And>b. b \<in> B-A \<Longrightarrow> 0 \<le> f b"
haftmann@54744
   763
shows "setsum f A \<le> setsum f B"
haftmann@54744
   764
proof -
haftmann@54744
   765
  have "setsum f A \<le> setsum f A + setsum f (B-A)"
haftmann@54744
   766
    by(simp add: add_increasing2[OF setsum_nonneg] nn Ball_def)
haftmann@54744
   767
  also have "\<dots> = setsum f (A \<union> (B-A))" using fin finite_subset[OF sub fin]
haftmann@54744
   768
    by (simp add:setsum_Un_disjoint del:Un_Diff_cancel)
haftmann@54744
   769
  also have "A \<union> (B-A) = B" using sub by blast
haftmann@54744
   770
  finally show ?thesis .
haftmann@54744
   771
qed
haftmann@54744
   772
haftmann@54744
   773
lemma setsum_mono3: "finite B ==> A <= B ==> 
haftmann@54744
   774
    ALL x: B - A. 
haftmann@54744
   775
      0 <= ((f x)::'a::{comm_monoid_add,ordered_ab_semigroup_add}) ==>
haftmann@54744
   776
        setsum f A <= setsum f B"
haftmann@54744
   777
  apply (subgoal_tac "setsum f B = setsum f A + setsum f (B - A)")
haftmann@54744
   778
  apply (erule ssubst)
haftmann@54744
   779
  apply (subgoal_tac "setsum f A + 0 <= setsum f A + setsum f (B - A)")
haftmann@54744
   780
  apply simp
haftmann@54744
   781
  apply (rule add_left_mono)
haftmann@54744
   782
  apply (erule setsum_nonneg)
haftmann@54744
   783
  apply (subst setsum_Un_disjoint [THEN sym])
haftmann@54744
   784
  apply (erule finite_subset, assumption)
haftmann@54744
   785
  apply (rule finite_subset)
haftmann@54744
   786
  prefer 2
haftmann@54744
   787
  apply assumption
haftmann@54744
   788
  apply (auto simp add: sup_absorb2)
haftmann@54744
   789
done
haftmann@54744
   790
haftmann@54744
   791
lemma setsum_right_distrib: 
haftmann@54744
   792
  fixes f :: "'a => ('b::semiring_0)"
haftmann@54744
   793
  shows "r * setsum f A = setsum (%n. r * f n) A"
haftmann@54744
   794
proof (cases "finite A")
haftmann@54744
   795
  case True
haftmann@54744
   796
  thus ?thesis
haftmann@54744
   797
  proof induct
haftmann@54744
   798
    case empty thus ?case by simp
haftmann@54744
   799
  next
haftmann@54744
   800
    case (insert x A) thus ?case by (simp add: distrib_left)
haftmann@54744
   801
  qed
haftmann@54744
   802
next
haftmann@54744
   803
  case False thus ?thesis by simp
haftmann@54744
   804
qed
haftmann@54744
   805
haftmann@54744
   806
lemma setsum_left_distrib:
haftmann@54744
   807
  "setsum f A * (r::'a::semiring_0) = (\<Sum>n\<in>A. f n * r)"
haftmann@54744
   808
proof (cases "finite A")
haftmann@54744
   809
  case True
haftmann@54744
   810
  then show ?thesis
haftmann@54744
   811
  proof induct
haftmann@54744
   812
    case empty thus ?case by simp
haftmann@54744
   813
  next
haftmann@54744
   814
    case (insert x A) thus ?case by (simp add: distrib_right)
haftmann@54744
   815
  qed
haftmann@54744
   816
next
haftmann@54744
   817
  case False thus ?thesis by simp
haftmann@54744
   818
qed
haftmann@54744
   819
haftmann@54744
   820
lemma setsum_divide_distrib:
haftmann@54744
   821
  "setsum f A / (r::'a::field) = (\<Sum>n\<in>A. f n / r)"
haftmann@54744
   822
proof (cases "finite A")
haftmann@54744
   823
  case True
haftmann@54744
   824
  then show ?thesis
haftmann@54744
   825
  proof induct
haftmann@54744
   826
    case empty thus ?case by simp
haftmann@54744
   827
  next
haftmann@54744
   828
    case (insert x A) thus ?case by (simp add: add_divide_distrib)
haftmann@54744
   829
  qed
haftmann@54744
   830
next
haftmann@54744
   831
  case False thus ?thesis by simp
haftmann@54744
   832
qed
haftmann@54744
   833
haftmann@54744
   834
lemma setsum_abs[iff]: 
haftmann@54744
   835
  fixes f :: "'a => ('b::ordered_ab_group_add_abs)"
haftmann@54744
   836
  shows "abs (setsum f A) \<le> setsum (%i. abs(f i)) A"
haftmann@54744
   837
proof (cases "finite A")
haftmann@54744
   838
  case True
haftmann@54744
   839
  thus ?thesis
haftmann@54744
   840
  proof induct
haftmann@54744
   841
    case empty thus ?case by simp
haftmann@54744
   842
  next
haftmann@54744
   843
    case (insert x A)
haftmann@54744
   844
    thus ?case by (auto intro: abs_triangle_ineq order_trans)
haftmann@54744
   845
  qed
haftmann@54744
   846
next
haftmann@54744
   847
  case False thus ?thesis by simp
haftmann@54744
   848
qed
haftmann@54744
   849
haftmann@54744
   850
lemma setsum_abs_ge_zero[iff]: 
haftmann@54744
   851
  fixes f :: "'a => ('b::ordered_ab_group_add_abs)"
haftmann@54744
   852
  shows "0 \<le> setsum (%i. abs(f i)) A"
haftmann@54744
   853
proof (cases "finite A")
haftmann@54744
   854
  case True
haftmann@54744
   855
  thus ?thesis
haftmann@54744
   856
  proof induct
haftmann@54744
   857
    case empty thus ?case by simp
haftmann@54744
   858
  next
haftmann@54744
   859
    case (insert x A) thus ?case by auto
haftmann@54744
   860
  qed
haftmann@54744
   861
next
haftmann@54744
   862
  case False thus ?thesis by simp
haftmann@54744
   863
qed
haftmann@54744
   864
haftmann@54744
   865
lemma abs_setsum_abs[simp]: 
haftmann@54744
   866
  fixes f :: "'a => ('b::ordered_ab_group_add_abs)"
haftmann@54744
   867
  shows "abs (\<Sum>a\<in>A. abs(f a)) = (\<Sum>a\<in>A. abs(f a))"
haftmann@54744
   868
proof (cases "finite A")
haftmann@54744
   869
  case True
haftmann@54744
   870
  thus ?thesis
haftmann@54744
   871
  proof induct
haftmann@54744
   872
    case empty thus ?case by simp
haftmann@54744
   873
  next
haftmann@54744
   874
    case (insert a A)
haftmann@54744
   875
    hence "\<bar>\<Sum>a\<in>insert a A. \<bar>f a\<bar>\<bar> = \<bar>\<bar>f a\<bar> + (\<Sum>a\<in>A. \<bar>f a\<bar>)\<bar>" by simp
haftmann@54744
   876
    also have "\<dots> = \<bar>\<bar>f a\<bar> + \<bar>\<Sum>a\<in>A. \<bar>f a\<bar>\<bar>\<bar>"  using insert by simp
haftmann@54744
   877
    also have "\<dots> = \<bar>f a\<bar> + \<bar>\<Sum>a\<in>A. \<bar>f a\<bar>\<bar>"
haftmann@54744
   878
      by (simp del: abs_of_nonneg)
haftmann@54744
   879
    also have "\<dots> = (\<Sum>a\<in>insert a A. \<bar>f a\<bar>)" using insert by simp
haftmann@54744
   880
    finally show ?case .
haftmann@54744
   881
  qed
haftmann@54744
   882
next
haftmann@54744
   883
  case False thus ?thesis by simp
haftmann@54744
   884
qed
haftmann@54744
   885
haftmann@54744
   886
lemma setsum_diff1'[rule_format]:
haftmann@54744
   887
  "finite A \<Longrightarrow> a \<in> A \<longrightarrow> (\<Sum> x \<in> A. f x) = f a + (\<Sum> x \<in> (A - {a}). f x)"
haftmann@54744
   888
apply (erule finite_induct[where F=A and P="% A. (a \<in> A \<longrightarrow> (\<Sum> x \<in> A. f x) = f a + (\<Sum> x \<in> (A - {a}). f x))"])
haftmann@54744
   889
apply (auto simp add: insert_Diff_if add_ac)
haftmann@54744
   890
done
haftmann@54744
   891
haftmann@54744
   892
lemma setsum_diff1_ring: assumes "finite A" "a \<in> A"
haftmann@54744
   893
  shows "setsum f (A - {a}) = setsum f A - (f a::'a::ring)"
haftmann@54744
   894
unfolding setsum_diff1'[OF assms] by auto
haftmann@54744
   895
haftmann@54744
   896
lemma setsum_product:
haftmann@54744
   897
  fixes f :: "'a => ('b::semiring_0)"
haftmann@54744
   898
  shows "setsum f A * setsum g B = (\<Sum>i\<in>A. \<Sum>j\<in>B. f i * g j)"
haftmann@54744
   899
  by (simp add: setsum_right_distrib setsum_left_distrib) (rule setsum_commute)
haftmann@54744
   900
haftmann@54744
   901
lemma setsum_mult_setsum_if_inj:
haftmann@54744
   902
fixes f :: "'a => ('b::semiring_0)"
haftmann@54744
   903
shows "inj_on (%(a,b). f a * g b) (A \<times> B) ==>
haftmann@54744
   904
  setsum f A * setsum g B = setsum id {f a * g b|a b. a:A & b:B}"
haftmann@54744
   905
by(auto simp: setsum_product setsum_cartesian_product
haftmann@54744
   906
        intro!:  setsum_reindex_cong[symmetric])
haftmann@54744
   907
haftmann@54744
   908
lemma setsum_SucD: "setsum f A = Suc n ==> EX a:A. 0 < f a"
haftmann@54744
   909
apply (case_tac "finite A")
haftmann@54744
   910
 prefer 2 apply simp
haftmann@54744
   911
apply (erule rev_mp)
haftmann@54744
   912
apply (erule finite_induct, auto)
haftmann@54744
   913
done
haftmann@54744
   914
haftmann@54744
   915
lemma setsum_eq_0_iff [simp]:
haftmann@54744
   916
  "finite F ==> (setsum f F = 0) = (ALL a:F. f a = (0::nat))"
haftmann@54744
   917
  by (induct set: finite) auto
haftmann@54744
   918
haftmann@54744
   919
lemma setsum_eq_Suc0_iff: "finite A \<Longrightarrow>
haftmann@54744
   920
  setsum f A = Suc 0 \<longleftrightarrow> (EX a:A. f a = Suc 0 & (ALL b:A. a\<noteq>b \<longrightarrow> f b = 0))"
haftmann@54744
   921
apply(erule finite_induct)
haftmann@54744
   922
apply (auto simp add:add_is_1)
haftmann@54744
   923
done
haftmann@54744
   924
haftmann@54744
   925
lemmas setsum_eq_1_iff = setsum_eq_Suc0_iff[simplified One_nat_def[symmetric]]
haftmann@54744
   926
haftmann@54744
   927
lemma setsum_Un_nat: "finite A ==> finite B ==>
haftmann@54744
   928
  (setsum f (A Un B) :: nat) = setsum f A + setsum f B - setsum f (A Int B)"
haftmann@54744
   929
  -- {* For the natural numbers, we have subtraction. *}
haftmann@54744
   930
by (subst setsum_Un_Int [symmetric], auto simp add: algebra_simps)
haftmann@54744
   931
haftmann@54744
   932
lemma setsum_diff1_nat: "(setsum f (A - {a}) :: nat) =
haftmann@54744
   933
  (if a:A then setsum f A - f a else setsum f A)"
haftmann@54744
   934
apply (case_tac "finite A")
haftmann@54744
   935
 prefer 2 apply simp
haftmann@54744
   936
apply (erule finite_induct)
haftmann@54744
   937
 apply (auto simp add: insert_Diff_if)
haftmann@54744
   938
apply (drule_tac a = a in mk_disjoint_insert, auto)
haftmann@54744
   939
done
haftmann@54744
   940
haftmann@54744
   941
lemma setsum_diff_nat: 
haftmann@54744
   942
assumes "finite B" and "B \<subseteq> A"
haftmann@54744
   943
shows "(setsum f (A - B) :: nat) = (setsum f A) - (setsum f B)"
haftmann@54744
   944
using assms
haftmann@54744
   945
proof induct
haftmann@54744
   946
  show "setsum f (A - {}) = (setsum f A) - (setsum f {})" by simp
haftmann@54744
   947
next
haftmann@54744
   948
  fix F x assume finF: "finite F" and xnotinF: "x \<notin> F"
haftmann@54744
   949
    and xFinA: "insert x F \<subseteq> A"
haftmann@54744
   950
    and IH: "F \<subseteq> A \<Longrightarrow> setsum f (A - F) = setsum f A - setsum f F"
haftmann@54744
   951
  from xnotinF xFinA have xinAF: "x \<in> (A - F)" by simp
haftmann@54744
   952
  from xinAF have A: "setsum f ((A - F) - {x}) = setsum f (A - F) - f x"
haftmann@54744
   953
    by (simp add: setsum_diff1_nat)
haftmann@54744
   954
  from xFinA have "F \<subseteq> A" by simp
haftmann@54744
   955
  with IH have "setsum f (A - F) = setsum f A - setsum f F" by simp
haftmann@54744
   956
  with A have B: "setsum f ((A - F) - {x}) = setsum f A - setsum f F - f x"
haftmann@54744
   957
    by simp
haftmann@54744
   958
  from xnotinF have "A - insert x F = (A - F) - {x}" by auto
haftmann@54744
   959
  with B have C: "setsum f (A - insert x F) = setsum f A - setsum f F - f x"
haftmann@54744
   960
    by simp
haftmann@54744
   961
  from finF xnotinF have "setsum f (insert x F) = setsum f F + f x" by simp
haftmann@54744
   962
  with C have "setsum f (A - insert x F) = setsum f A - setsum f (insert x F)"
haftmann@54744
   963
    by simp
haftmann@54744
   964
  thus "setsum f (A - insert x F) = setsum f A - setsum f (insert x F)" by simp
haftmann@54744
   965
qed
haftmann@54744
   966
haftmann@54744
   967
lemma setsum_comp_morphism:
haftmann@54744
   968
  assumes "h 0 = 0" and "\<And>x y. h (x + y) = h x + h y"
haftmann@54744
   969
  shows "setsum (h \<circ> g) A = h (setsum g A)"
haftmann@54744
   970
proof (cases "finite A")
haftmann@54744
   971
  case False then show ?thesis by (simp add: assms)
haftmann@54744
   972
next
haftmann@54744
   973
  case True then show ?thesis by (induct A) (simp_all add: assms)
haftmann@54744
   974
qed
haftmann@54744
   975
haftmann@54744
   976
haftmann@54744
   977
subsubsection {* Cardinality as special case of @{const setsum} *}
haftmann@54744
   978
haftmann@54744
   979
lemma card_eq_setsum:
haftmann@54744
   980
  "card A = setsum (\<lambda>x. 1) A"
haftmann@54744
   981
proof -
haftmann@54744
   982
  have "plus \<circ> (\<lambda>_. Suc 0) = (\<lambda>_. Suc)"
haftmann@54744
   983
    by (simp add: fun_eq_iff)
haftmann@54744
   984
  then have "Finite_Set.fold (plus \<circ> (\<lambda>_. Suc 0)) = Finite_Set.fold (\<lambda>_. Suc)"
haftmann@54744
   985
    by (rule arg_cong)
haftmann@54744
   986
  then have "Finite_Set.fold (plus \<circ> (\<lambda>_. Suc 0)) 0 A = Finite_Set.fold (\<lambda>_. Suc) 0 A"
haftmann@54744
   987
    by (blast intro: fun_cong)
haftmann@54744
   988
  then show ?thesis by (simp add: card.eq_fold setsum.eq_fold)
haftmann@54744
   989
qed
haftmann@54744
   990
haftmann@54744
   991
lemma setsum_constant [simp]:
haftmann@54744
   992
  "(\<Sum>x \<in> A. y) = of_nat (card A) * y"
haftmann@54744
   993
apply (cases "finite A")
haftmann@54744
   994
apply (erule finite_induct)
haftmann@54744
   995
apply (auto simp add: algebra_simps)
haftmann@54744
   996
done
haftmann@54744
   997
haftmann@54744
   998
lemma setsum_bounded:
haftmann@54744
   999
  assumes le: "\<And>i. i\<in>A \<Longrightarrow> f i \<le> (K::'a::{semiring_1, ordered_ab_semigroup_add})"
haftmann@54744
  1000
  shows "setsum f A \<le> of_nat (card A) * K"
haftmann@54744
  1001
proof (cases "finite A")
haftmann@54744
  1002
  case True
haftmann@54744
  1003
  thus ?thesis using le setsum_mono[where K=A and g = "%x. K"] by simp
haftmann@54744
  1004
next
haftmann@54744
  1005
  case False thus ?thesis by simp
haftmann@54744
  1006
qed
haftmann@54744
  1007
haftmann@54744
  1008
lemma card_UN_disjoint:
haftmann@54744
  1009
  assumes "finite I" and "\<forall>i\<in>I. finite (A i)"
haftmann@54744
  1010
    and "\<forall>i\<in>I. \<forall>j\<in>I. i \<noteq> j \<longrightarrow> A i \<inter> A j = {}"
haftmann@54744
  1011
  shows "card (UNION I A) = (\<Sum>i\<in>I. card(A i))"
haftmann@54744
  1012
proof -
haftmann@54744
  1013
  have "(\<Sum>i\<in>I. card (A i)) = (\<Sum>i\<in>I. \<Sum>x\<in>A i. 1)" by simp
haftmann@54744
  1014
  with assms show ?thesis by (simp add: card_eq_setsum setsum_UN_disjoint del: setsum_constant)
haftmann@54744
  1015
qed
haftmann@54744
  1016
haftmann@54744
  1017
lemma card_Union_disjoint:
haftmann@54744
  1018
  "finite C ==> (ALL A:C. finite A) ==>
haftmann@54744
  1019
   (ALL A:C. ALL B:C. A \<noteq> B --> A Int B = {})
haftmann@54744
  1020
   ==> card (Union C) = setsum card C"
haftmann@54744
  1021
apply (frule card_UN_disjoint [of C id])
haftmann@56166
  1022
apply simp_all
haftmann@54744
  1023
done
haftmann@54744
  1024
haftmann@54744
  1025
haftmann@54744
  1026
subsubsection {* Cardinality of products *}
haftmann@54744
  1027
haftmann@54744
  1028
lemma card_SigmaI [simp]:
haftmann@54744
  1029
  "\<lbrakk> finite A; ALL a:A. finite (B a) \<rbrakk>
haftmann@54744
  1030
  \<Longrightarrow> card (SIGMA x: A. B x) = (\<Sum>a\<in>A. card (B a))"
haftmann@54744
  1031
by(simp add: card_eq_setsum setsum_Sigma del:setsum_constant)
haftmann@54744
  1032
haftmann@54744
  1033
(*
haftmann@54744
  1034
lemma SigmaI_insert: "y \<notin> A ==>
haftmann@54744
  1035
  (SIGMA x:(insert y A). B x) = (({y} <*> (B y)) \<union> (SIGMA x: A. B x))"
haftmann@54744
  1036
  by auto
haftmann@54744
  1037
*)
haftmann@54744
  1038
haftmann@54744
  1039
lemma card_cartesian_product: "card (A <*> B) = card(A) * card(B)"
haftmann@54744
  1040
  by (cases "finite A \<and> finite B")
haftmann@54744
  1041
    (auto simp add: card_eq_0_iff dest: finite_cartesian_productD1 finite_cartesian_productD2)
haftmann@54744
  1042
haftmann@54744
  1043
lemma card_cartesian_product_singleton:  "card({x} <*> A) = card(A)"
haftmann@54744
  1044
by (simp add: card_cartesian_product)
haftmann@54744
  1045
haftmann@54744
  1046
haftmann@54744
  1047
subsection {* Generalized product over a set *}
haftmann@54744
  1048
haftmann@54744
  1049
context comm_monoid_mult
haftmann@54744
  1050
begin
haftmann@54744
  1051
haftmann@54744
  1052
definition setprod :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b set \<Rightarrow> 'a"
haftmann@54744
  1053
where
haftmann@54744
  1054
  "setprod = comm_monoid_set.F times 1"
haftmann@54744
  1055
haftmann@54744
  1056
sublocale setprod!: comm_monoid_set times 1
haftmann@54744
  1057
where
haftmann@54744
  1058
  "comm_monoid_set.F times 1 = setprod"
haftmann@54744
  1059
proof -
haftmann@54744
  1060
  show "comm_monoid_set times 1" ..
haftmann@54744
  1061
  then interpret setprod!: comm_monoid_set times 1 .
haftmann@54744
  1062
  from setprod_def show "comm_monoid_set.F times 1 = setprod" by rule
haftmann@54744
  1063
qed
haftmann@54744
  1064
haftmann@54744
  1065
abbreviation
haftmann@54744
  1066
  Setprod ("\<Prod>_" [1000] 999) where
haftmann@54744
  1067
  "\<Prod>A \<equiv> setprod (\<lambda>x. x) A"
haftmann@54744
  1068
haftmann@54744
  1069
end
haftmann@54744
  1070
haftmann@54744
  1071
syntax
haftmann@54744
  1072
  "_setprod" :: "pttrn => 'a set => 'b => 'b::comm_monoid_mult"  ("(3PROD _:_. _)" [0, 51, 10] 10)
haftmann@54744
  1073
syntax (xsymbols)
haftmann@54744
  1074
  "_setprod" :: "pttrn => 'a set => 'b => 'b::comm_monoid_mult"  ("(3\<Prod>_\<in>_. _)" [0, 51, 10] 10)
haftmann@54744
  1075
syntax (HTML output)
haftmann@54744
  1076
  "_setprod" :: "pttrn => 'a set => 'b => 'b::comm_monoid_mult"  ("(3\<Prod>_\<in>_. _)" [0, 51, 10] 10)
haftmann@54744
  1077
haftmann@54744
  1078
translations -- {* Beware of argument permutation! *}
haftmann@54744
  1079
  "PROD i:A. b" == "CONST setprod (%i. b) A" 
haftmann@54744
  1080
  "\<Prod>i\<in>A. b" == "CONST setprod (%i. b) A" 
haftmann@54744
  1081
haftmann@54744
  1082
text{* Instead of @{term"\<Prod>x\<in>{x. P}. e"} we introduce the shorter
haftmann@54744
  1083
 @{text"\<Prod>x|P. e"}. *}
haftmann@54744
  1084
haftmann@54744
  1085
syntax
haftmann@54744
  1086
  "_qsetprod" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3PROD _ |/ _./ _)" [0,0,10] 10)
haftmann@54744
  1087
syntax (xsymbols)
haftmann@54744
  1088
  "_qsetprod" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3\<Prod>_ | (_)./ _)" [0,0,10] 10)
haftmann@54744
  1089
syntax (HTML output)
haftmann@54744
  1090
  "_qsetprod" :: "pttrn \<Rightarrow> bool \<Rightarrow> 'a \<Rightarrow> 'a" ("(3\<Prod>_ | (_)./ _)" [0,0,10] 10)
haftmann@54744
  1091
haftmann@54744
  1092
translations
haftmann@54744
  1093
  "PROD x|P. t" => "CONST setprod (%x. t) {x. P}"
haftmann@54744
  1094
  "\<Prod>x|P. t" => "CONST setprod (%x. t) {x. P}"
haftmann@54744
  1095
haftmann@54744
  1096
text {* TODO These are candidates for generalization *}
haftmann@54744
  1097
haftmann@54744
  1098
context comm_monoid_mult
haftmann@54744
  1099
begin
haftmann@54744
  1100
haftmann@54744
  1101
lemma setprod_reindex_id:
haftmann@54744
  1102
  "inj_on f B ==> setprod f B = setprod id (f ` B)"
haftmann@54744
  1103
  by (auto simp add: setprod.reindex)
haftmann@54744
  1104
haftmann@54744
  1105
lemma setprod_reindex_cong:
haftmann@54744
  1106
  "inj_on f A ==> B = f ` A ==> g = h \<circ> f ==> setprod h B = setprod g A"
haftmann@54744
  1107
  by (frule setprod.reindex, simp)
haftmann@54744
  1108
haftmann@54744
  1109
lemma strong_setprod_reindex_cong:
haftmann@54744
  1110
  assumes i: "inj_on f A"
haftmann@54744
  1111
  and B: "B = f ` A" and eq: "\<And>x. x \<in> A \<Longrightarrow> g x = (h \<circ> f) x"
haftmann@54744
  1112
  shows "setprod h B = setprod g A"
haftmann@54744
  1113
proof-
haftmann@54744
  1114
  have "setprod h B = setprod (h o f) A"
haftmann@54744
  1115
    by (simp add: B setprod.reindex [OF i, of h])
haftmann@54744
  1116
  then show ?thesis apply simp
haftmann@54744
  1117
    apply (rule setprod.cong)
haftmann@54744
  1118
    apply simp
haftmann@54744
  1119
    by (simp add: eq)
haftmann@54744
  1120
qed
haftmann@54744
  1121
haftmann@54744
  1122
lemma setprod_Union_disjoint:
haftmann@54744
  1123
  assumes "\<forall>A\<in>C. finite A" "\<forall>A\<in>C. \<forall>B\<in>C. A \<noteq> B \<longrightarrow> A Int B = {}" 
haftmann@54744
  1124
  shows "setprod f (Union C) = setprod (setprod f) C"
haftmann@54744
  1125
  using assms by (fact setprod.Union_disjoint)
haftmann@54744
  1126
haftmann@54744
  1127
text{*Here we can eliminate the finiteness assumptions, by cases.*}
haftmann@54744
  1128
lemma setprod_cartesian_product:
haftmann@54744
  1129
  "(\<Prod>x\<in>A. (\<Prod>y\<in> B. f x y)) = (\<Prod>(x,y)\<in>(A <*> B). f x y)"
haftmann@54744
  1130
  by (fact setprod.cartesian_product)
haftmann@54744
  1131
haftmann@54744
  1132
lemma setprod_Un2:
haftmann@54744
  1133
  assumes "finite (A \<union> B)"
haftmann@54744
  1134
  shows "setprod f (A \<union> B) = setprod f (A - B) * setprod f (B - A) * setprod f (A \<inter> B)"
haftmann@54744
  1135
proof -
haftmann@54744
  1136
  have "A \<union> B = A - B \<union> (B - A) \<union> A \<inter> B"
haftmann@54744
  1137
    by auto
haftmann@54744
  1138
  with assms show ?thesis by simp (subst setprod.union_disjoint, auto)+
haftmann@54744
  1139
qed
haftmann@54744
  1140
haftmann@54744
  1141
end
haftmann@54744
  1142
haftmann@54744
  1143
text {* TODO These are legacy *}
haftmann@54744
  1144
haftmann@54744
  1145
lemma setprod_empty: "setprod f {} = 1"
haftmann@54744
  1146
  by (fact setprod.empty)
haftmann@54744
  1147
haftmann@54744
  1148
lemma setprod_insert: "[| finite A; a \<notin> A |] ==>
haftmann@54744
  1149
    setprod f (insert a A) = f a * setprod f A"
haftmann@54744
  1150
  by (fact setprod.insert)
haftmann@54744
  1151
haftmann@54744
  1152
lemma setprod_infinite: "~ finite A ==> setprod f A = 1"
haftmann@54744
  1153
  by (fact setprod.infinite)
haftmann@54744
  1154
haftmann@54744
  1155
lemma setprod_reindex:
haftmann@54744
  1156
  "inj_on f B ==> setprod h (f ` B) = setprod (h \<circ> f) B"
haftmann@54744
  1157
  by (fact setprod.reindex)
haftmann@54744
  1158
haftmann@54744
  1159
lemma setprod_cong:
haftmann@54744
  1160
  "A = B ==> (!!x. x:B ==> f x = g x) ==> setprod f A = setprod g B"
haftmann@54744
  1161
  by (fact setprod.cong)
haftmann@54744
  1162
haftmann@54744
  1163
lemma strong_setprod_cong:
haftmann@54744
  1164
  "A = B ==> (!!x. x:B =simp=> f x = g x) ==> setprod f A = setprod g B"
haftmann@54744
  1165
  by (fact setprod.strong_cong)
haftmann@54744
  1166
haftmann@54744
  1167
lemma setprod_Un_one:
haftmann@54744
  1168
  "\<lbrakk> finite S; finite T; \<forall>x \<in> S\<inter>T. f x = 1 \<rbrakk>
haftmann@54744
  1169
  \<Longrightarrow> setprod f (S \<union> T) = setprod f S  * setprod f T"
haftmann@54744
  1170
  by (fact setprod.union_inter_neutral)
haftmann@54744
  1171
haftmann@54744
  1172
lemmas setprod_1 = setprod.neutral_const
haftmann@54744
  1173
lemmas setprod_1' = setprod.neutral
haftmann@54744
  1174
haftmann@54744
  1175
lemma setprod_Un_Int: "finite A ==> finite B
haftmann@54744
  1176
    ==> setprod g (A Un B) * setprod g (A Int B) = setprod g A * setprod g B"
haftmann@54744
  1177
  by (fact setprod.union_inter)
haftmann@54744
  1178
haftmann@54744
  1179
lemma setprod_Un_disjoint: "finite A ==> finite B
haftmann@54744
  1180
  ==> A Int B = {} ==> setprod g (A Un B) = setprod g A * setprod g B"
haftmann@54744
  1181
  by (fact setprod.union_disjoint)
haftmann@54744
  1182
haftmann@54744
  1183
lemma setprod_subset_diff: "\<lbrakk> B \<subseteq> A; finite A \<rbrakk> \<Longrightarrow>
haftmann@54744
  1184
    setprod f A = setprod f (A - B) * setprod f B"
haftmann@54744
  1185
  by (fact setprod.subset_diff)
haftmann@54744
  1186
haftmann@54744
  1187
lemma setprod_mono_one_left:
haftmann@54744
  1188
  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. f i = 1 \<rbrakk> \<Longrightarrow> setprod f S = setprod f T"
haftmann@54744
  1189
  by (fact setprod.mono_neutral_left)
haftmann@54744
  1190
haftmann@54744
  1191
lemmas setprod_mono_one_right = setprod.mono_neutral_right
haftmann@54744
  1192
haftmann@54744
  1193
lemma setprod_mono_one_cong_left: 
haftmann@54744
  1194
  "\<lbrakk> finite T; S \<subseteq> T; \<forall>i \<in> T - S. g i = 1; \<And>x. x \<in> S \<Longrightarrow> f x = g x \<rbrakk>
haftmann@54744
  1195
  \<Longrightarrow> setprod f S = setprod g T"
haftmann@54744
  1196
  by (fact setprod.mono_neutral_cong_left)
haftmann@54744
  1197
haftmann@54744
  1198
lemmas setprod_mono_one_cong_right = setprod.mono_neutral_cong_right
haftmann@54744
  1199
haftmann@54744
  1200
lemma setprod_delta: "finite S \<Longrightarrow>
haftmann@54744
  1201
  setprod (\<lambda>k. if k=a then b k else 1) S = (if a \<in> S then b a else 1)"
haftmann@54744
  1202
  by (fact setprod.delta)
haftmann@54744
  1203
haftmann@54744
  1204
lemma setprod_delta': "finite S \<Longrightarrow>
haftmann@54744
  1205
  setprod (\<lambda>k. if a = k then b k else 1) S = (if a\<in> S then b a else 1)"
haftmann@54744
  1206
  by (fact setprod.delta')
haftmann@54744
  1207
haftmann@54744
  1208
lemma setprod_UN_disjoint:
haftmann@54744
  1209
    "finite I ==> (ALL i:I. finite (A i)) ==>
haftmann@54744
  1210
        (ALL i:I. ALL j:I. i \<noteq> j --> A i Int A j = {}) ==>
haftmann@54744
  1211
      setprod f (UNION I A) = setprod (%i. setprod f (A i)) I"
haftmann@54744
  1212
  by (fact setprod.UNION_disjoint)
haftmann@54744
  1213
haftmann@54744
  1214
lemma setprod_Sigma: "finite A ==> ALL x:A. finite (B x) ==>
haftmann@54744
  1215
    (\<Prod>x\<in>A. (\<Prod>y\<in> B x. f x y)) =
haftmann@54744
  1216
    (\<Prod>(x,y)\<in>(SIGMA x:A. B x). f x y)"
haftmann@54744
  1217
  by (fact setprod.Sigma)
haftmann@54744
  1218
haftmann@54744
  1219
lemma setprod_timesf: "setprod (\<lambda>x. f x * g x) A = setprod f A * setprod g A"
haftmann@54744
  1220
  by (fact setprod.distrib)
haftmann@54744
  1221
haftmann@54744
  1222
haftmann@54744
  1223
subsubsection {* Properties in more restricted classes of structures *}
haftmann@54744
  1224
haftmann@54744
  1225
lemma setprod_zero:
haftmann@54744
  1226
     "finite A ==> EX x: A. f x = (0::'a::comm_semiring_1) ==> setprod f A = 0"
haftmann@54744
  1227
apply (induct set: finite, force, clarsimp)
haftmann@54744
  1228
apply (erule disjE, auto)
haftmann@54744
  1229
done
haftmann@54744
  1230
haftmann@54744
  1231
lemma setprod_zero_iff[simp]: "finite A ==> 
haftmann@54744
  1232
  (setprod f A = (0::'a::{comm_semiring_1,no_zero_divisors})) =
haftmann@54744
  1233
  (EX x: A. f x = 0)"
haftmann@54744
  1234
by (erule finite_induct, auto simp:no_zero_divisors)
haftmann@54744
  1235
haftmann@54744
  1236
lemma setprod_Un: "finite A ==> finite B ==> (ALL x: A Int B. f x \<noteq> 0) ==>
haftmann@54744
  1237
  (setprod f (A Un B) :: 'a ::{field})
haftmann@54744
  1238
   = setprod f A * setprod f B / setprod f (A Int B)"
haftmann@54744
  1239
by (subst setprod_Un_Int [symmetric], auto)
haftmann@54744
  1240
haftmann@54744
  1241
lemma setprod_nonneg [rule_format]:
haftmann@54744
  1242
   "(ALL x: A. (0::'a::linordered_semidom) \<le> f x) --> 0 \<le> setprod f A"
haftmann@54744
  1243
by (cases "finite A", induct set: finite, simp_all add: mult_nonneg_nonneg)
haftmann@54744
  1244
haftmann@54744
  1245
lemma setprod_pos [rule_format]: "(ALL x: A. (0::'a::linordered_semidom) < f x)
haftmann@54744
  1246
  --> 0 < setprod f A"
haftmann@54744
  1247
by (cases "finite A", induct set: finite, simp_all add: mult_pos_pos)
haftmann@54744
  1248
haftmann@54744
  1249
lemma setprod_diff1: "finite A ==> f a \<noteq> 0 ==>
haftmann@54744
  1250
  (setprod f (A - {a}) :: 'a :: {field}) =
haftmann@54744
  1251
  (if a:A then setprod f A / f a else setprod f A)"
haftmann@54744
  1252
  by (erule finite_induct) (auto simp add: insert_Diff_if)
haftmann@54744
  1253
haftmann@54744
  1254
lemma setprod_inversef: 
haftmann@54744
  1255
  fixes f :: "'b \<Rightarrow> 'a::field_inverse_zero"
haftmann@54744
  1256
  shows "finite A ==> setprod (inverse \<circ> f) A = inverse (setprod f A)"
haftmann@54744
  1257
by (erule finite_induct) auto
haftmann@54744
  1258
haftmann@54744
  1259
lemma setprod_dividef:
haftmann@54744
  1260
  fixes f :: "'b \<Rightarrow> 'a::field_inverse_zero"
haftmann@54744
  1261
  shows "finite A
haftmann@54744
  1262
    ==> setprod (%x. f x / g x) A = setprod f A / setprod g A"
haftmann@54744
  1263
apply (subgoal_tac
haftmann@54744
  1264
         "setprod (%x. f x / g x) A = setprod (%x. f x * (inverse \<circ> g) x) A")
haftmann@54744
  1265
apply (erule ssubst)
haftmann@54744
  1266
apply (subst divide_inverse)
haftmann@54744
  1267
apply (subst setprod_timesf)
haftmann@54744
  1268
apply (subst setprod_inversef, assumption+, rule refl)
haftmann@54744
  1269
apply (rule setprod_cong, rule refl)
haftmann@54744
  1270
apply (subst divide_inverse, auto)
haftmann@54744
  1271
done
haftmann@54744
  1272
haftmann@54744
  1273
lemma setprod_dvd_setprod [rule_format]: 
haftmann@54744
  1274
    "(ALL x : A. f x dvd g x) \<longrightarrow> setprod f A dvd setprod g A"
haftmann@54744
  1275
  apply (cases "finite A")
haftmann@54744
  1276
  apply (induct set: finite)
haftmann@54744
  1277
  apply (auto simp add: dvd_def)
haftmann@54744
  1278
  apply (rule_tac x = "k * ka" in exI)
haftmann@54744
  1279
  apply (simp add: algebra_simps)
haftmann@54744
  1280
done
haftmann@54744
  1281
haftmann@54744
  1282
lemma setprod_dvd_setprod_subset:
haftmann@54744
  1283
  "finite B \<Longrightarrow> A <= B \<Longrightarrow> setprod f A dvd setprod f B"
haftmann@54744
  1284
  apply (subgoal_tac "setprod f B = setprod f A * setprod f (B - A)")
haftmann@54744
  1285
  apply (unfold dvd_def, blast)
haftmann@54744
  1286
  apply (subst setprod_Un_disjoint [symmetric])
haftmann@54744
  1287
  apply (auto elim: finite_subset intro: setprod_cong)
haftmann@54744
  1288
done
haftmann@54744
  1289
haftmann@54744
  1290
lemma setprod_dvd_setprod_subset2:
haftmann@54744
  1291
  "finite B \<Longrightarrow> A <= B \<Longrightarrow> ALL x : A. (f x::'a::comm_semiring_1) dvd g x \<Longrightarrow> 
haftmann@54744
  1292
      setprod f A dvd setprod g B"
haftmann@54744
  1293
  apply (rule dvd_trans)
haftmann@54744
  1294
  apply (rule setprod_dvd_setprod, erule (1) bspec)
haftmann@54744
  1295
  apply (erule (1) setprod_dvd_setprod_subset)
haftmann@54744
  1296
done
haftmann@54744
  1297
haftmann@54744
  1298
lemma dvd_setprod: "finite A \<Longrightarrow> i:A \<Longrightarrow> 
haftmann@54744
  1299
    (f i ::'a::comm_semiring_1) dvd setprod f A"
haftmann@54744
  1300
by (induct set: finite) (auto intro: dvd_mult)
haftmann@54744
  1301
haftmann@54744
  1302
lemma dvd_setsum [rule_format]: "(ALL i : A. d dvd f i) \<longrightarrow> 
haftmann@54744
  1303
    (d::'a::comm_semiring_1) dvd (SUM x : A. f x)"
haftmann@54744
  1304
  apply (cases "finite A")
haftmann@54744
  1305
  apply (induct set: finite)
haftmann@54744
  1306
  apply auto
haftmann@54744
  1307
done
haftmann@54744
  1308
haftmann@54744
  1309
lemma setprod_mono:
haftmann@54744
  1310
  fixes f :: "'a \<Rightarrow> 'b\<Colon>linordered_semidom"
haftmann@54744
  1311
  assumes "\<forall>i\<in>A. 0 \<le> f i \<and> f i \<le> g i"
haftmann@54744
  1312
  shows "setprod f A \<le> setprod g A"
haftmann@54744
  1313
proof (cases "finite A")
haftmann@54744
  1314
  case True
haftmann@54744
  1315
  hence ?thesis "setprod f A \<ge> 0" using subset_refl[of A]
haftmann@54744
  1316
  proof (induct A rule: finite_subset_induct)
haftmann@54744
  1317
    case (insert a F)
haftmann@54744
  1318
    thus "setprod f (insert a F) \<le> setprod g (insert a F)" "0 \<le> setprod f (insert a F)"
haftmann@54744
  1319
      unfolding setprod_insert[OF insert(1,3)]
haftmann@54744
  1320
      using assms[rule_format,OF insert(2)] insert
haftmann@54744
  1321
      by (auto intro: mult_mono mult_nonneg_nonneg)
haftmann@54744
  1322
  qed auto
haftmann@54744
  1323
  thus ?thesis by simp
haftmann@54744
  1324
qed auto
haftmann@54744
  1325
haftmann@54744
  1326
lemma abs_setprod:
haftmann@54744
  1327
  fixes f :: "'a \<Rightarrow> 'b\<Colon>{linordered_field,abs}"
haftmann@54744
  1328
  shows "abs (setprod f A) = setprod (\<lambda>x. abs (f x)) A"
haftmann@54744
  1329
proof (cases "finite A")
haftmann@54744
  1330
  case True thus ?thesis
haftmann@54744
  1331
    by induct (auto simp add: field_simps abs_mult)
haftmann@54744
  1332
qed auto
haftmann@54744
  1333
haftmann@54744
  1334
lemma setprod_eq_1_iff [simp]:
haftmann@54744
  1335
  "finite F ==> setprod f F = 1 \<longleftrightarrow> (ALL a:F. f a = (1::nat))"
haftmann@54744
  1336
  by (induct set: finite) auto
haftmann@54744
  1337
haftmann@54744
  1338
lemma setprod_pos_nat:
haftmann@54744
  1339
  "finite S ==> (ALL x : S. f x > (0::nat)) ==> setprod f S > 0"
haftmann@54744
  1340
using setprod_zero_iff by(simp del:neq0_conv add:neq0_conv[symmetric])
haftmann@54744
  1341
haftmann@54744
  1342
lemma setprod_pos_nat_iff[simp]:
haftmann@54744
  1343
  "finite S ==> (setprod f S > 0) = (ALL x : S. f x > (0::nat))"
haftmann@54744
  1344
using setprod_zero_iff by(simp del:neq0_conv add:neq0_conv[symmetric])
haftmann@54744
  1345
haftmann@54744
  1346
end