src/HOL/Complete_Lattices.thy
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(*  Title:      HOL/Complete_Lattices.thy
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    Author:     Tobias Nipkow
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    Author:     Lawrence C Paulson
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    Author:     Markus Wenzel
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    Author:     Florian Haftmann
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    Author:     Viorel Preoteasa (Complete Distributive Lattices)     
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*)
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section \<open>Complete lattices\<close>
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theory Complete_Lattices
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  imports Fun
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begin
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subsection \<open>Syntactic infimum and supremum operations\<close>
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class Inf =
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  fixes Inf :: "'a set \<Rightarrow> 'a"  ("\<Sqinter>")
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class Sup =
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  fixes Sup :: "'a set \<Rightarrow> 'a"  ("\<Squnion>")
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syntax
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  "_INF1"     :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b"           ("(3INF _./ _)" [0, 10] 10)
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  "_INF"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b"  ("(3INF _\<in>_./ _)" [0, 0, 10] 10)
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  "_SUP1"     :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b"           ("(3SUP _./ _)" [0, 10] 10)
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  "_SUP"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b"  ("(3SUP _\<in>_./ _)" [0, 0, 10] 10)
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syntax
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  "_INF1"     :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b"           ("(3\<Sqinter>_./ _)" [0, 10] 10)
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  "_INF"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b"  ("(3\<Sqinter>_\<in>_./ _)" [0, 0, 10] 10)
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  "_SUP1"     :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b"           ("(3\<Squnion>_./ _)" [0, 10] 10)
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  "_SUP"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b"  ("(3\<Squnion>_\<in>_./ _)" [0, 0, 10] 10)
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translations
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  "\<Sqinter>x y. f"   \<rightleftharpoons> "\<Sqinter>x. \<Sqinter>y. f"
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  "\<Sqinter>x. f"     \<rightleftharpoons> "\<Sqinter>(CONST range (\<lambda>x. f))"
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  "\<Sqinter>x\<in>A. f"   \<rightleftharpoons> "CONST Inf ((\<lambda>x. f) ` A)"
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  "\<Squnion>x y. f"   \<rightleftharpoons> "\<Squnion>x. \<Squnion>y. f"
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  "\<Squnion>x. f"     \<rightleftharpoons> "\<Squnion>(CONST range (\<lambda>x. f))"
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  "\<Squnion>x\<in>A. f"   \<rightleftharpoons> "CONST Sup ((\<lambda>x. f) `  A)"
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context Inf
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begin
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lemma INF_image: "\<Sqinter> (g ` f ` A) = \<Sqinter> ((g \<circ> f) ` A)"
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  by (simp add: image_comp)
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lemma INF_identity_eq [simp]: "(\<Sqinter>x\<in>A. x) = \<Sqinter>A"
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  by simp
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lemma INF_id_eq [simp]: "\<Sqinter>(id ` A) = \<Sqinter>A"
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  by simp
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lemma INF_cong: "A = B \<Longrightarrow> (\<And>x. x \<in> B \<Longrightarrow> C x = D x) \<Longrightarrow> \<Sqinter>(C ` A) = \<Sqinter>(D ` B)"
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  by (simp add: image_def)
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lemma INF_cong_simp:
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  "A = B \<Longrightarrow> (\<And>x. x \<in> B =simp=> C x = D x) \<Longrightarrow> \<Sqinter>(C ` A) = \<Sqinter>(D ` B)"
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  unfolding simp_implies_def by (fact INF_cong)
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end
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context Sup
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begin
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lemma SUP_image: "\<Squnion> (g ` f ` A) = \<Squnion> ((g \<circ> f) ` A)"
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by(fact Inf.INF_image)
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lemma SUP_identity_eq [simp]: "(\<Squnion>x\<in>A. x) = \<Squnion>A"
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by(fact Inf.INF_identity_eq)
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lemma SUP_id_eq [simp]: "\<Squnion>(id ` A) = \<Squnion>A"
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by(fact Inf.INF_id_eq)
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lemma SUP_cong: "A = B \<Longrightarrow> (\<And>x. x \<in> B \<Longrightarrow> C x = D x) \<Longrightarrow> \<Squnion>(C ` A) = \<Squnion>(D ` B)"
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by (fact Inf.INF_cong)
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lemma SUP_cong_simp:
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  "A = B \<Longrightarrow> (\<And>x. x \<in> B =simp=> C x = D x) \<Longrightarrow> \<Squnion>(C ` A) = \<Squnion>(D ` B)"
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by (fact Inf.INF_cong_simp)
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end
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subsection \<open>Abstract complete lattices\<close>
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text \<open>A complete lattice always has a bottom and a top,
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so we include them into the following type class,
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along with assumptions that define bottom and top
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in terms of infimum and supremum.\<close>
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class complete_lattice = lattice + Inf + Sup + bot + top +
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  assumes Inf_lower: "x \<in> A \<Longrightarrow> \<Sqinter>A \<le> x"
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    and Inf_greatest: "(\<And>x. x \<in> A \<Longrightarrow> z \<le> x) \<Longrightarrow> z \<le> \<Sqinter>A"
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    and Sup_upper: "x \<in> A \<Longrightarrow> x \<le> \<Squnion>A"
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    and Sup_least: "(\<And>x. x \<in> A \<Longrightarrow> x \<le> z) \<Longrightarrow> \<Squnion>A \<le> z"
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    and Inf_empty [simp]: "\<Sqinter>{} = \<top>"
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    and Sup_empty [simp]: "\<Squnion>{} = \<bottom>"
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begin
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subclass bounded_lattice
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proof
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  fix a
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  show "\<bottom> \<le> a"
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    by (auto intro: Sup_least simp only: Sup_empty [symmetric])
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  show "a \<le> \<top>"
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    by (auto intro: Inf_greatest simp only: Inf_empty [symmetric])
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qed
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lemma dual_complete_lattice: "class.complete_lattice Sup Inf sup (\<ge>) (>) inf \<top> \<bottom>"
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  by (auto intro!: class.complete_lattice.intro dual_lattice)
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    (unfold_locales, (fact Inf_empty Sup_empty Sup_upper Sup_least Inf_lower Inf_greatest)+)
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end
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context complete_lattice
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begin
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lemma Sup_eqI:
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  "(\<And>y. y \<in> A \<Longrightarrow> y \<le> x) \<Longrightarrow> (\<And>y. (\<And>z. z \<in> A \<Longrightarrow> z \<le> y) \<Longrightarrow> x \<le> y) \<Longrightarrow> \<Squnion>A = x"
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  by (blast intro: order.antisym Sup_least Sup_upper)
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lemma Inf_eqI:
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  "(\<And>i. i \<in> A \<Longrightarrow> x \<le> i) \<Longrightarrow> (\<And>y. (\<And>i. i \<in> A \<Longrightarrow> y \<le> i) \<Longrightarrow> y \<le> x) \<Longrightarrow> \<Sqinter>A = x"
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  by (blast intro: order.antisym Inf_greatest Inf_lower)
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lemma SUP_eqI:
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  "(\<And>i. i \<in> A \<Longrightarrow> f i \<le> x) \<Longrightarrow> (\<And>y. (\<And>i. i \<in> A \<Longrightarrow> f i \<le> y) \<Longrightarrow> x \<le> y) \<Longrightarrow> (\<Squnion>i\<in>A. f i) = x"
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  using Sup_eqI [of "f ` A" x] by auto
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lemma INF_eqI:
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  "(\<And>i. i \<in> A \<Longrightarrow> x \<le> f i) \<Longrightarrow> (\<And>y. (\<And>i. i \<in> A \<Longrightarrow> f i \<ge> y) \<Longrightarrow> x \<ge> y) \<Longrightarrow> (\<Sqinter>i\<in>A. f i) = x"
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  using Inf_eqI [of "f ` A" x] by auto
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lemma INF_lower: "i \<in> A \<Longrightarrow> (\<Sqinter>i\<in>A. f i) \<le> f i"
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  using Inf_lower [of _ "f ` A"] by simp
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lemma INF_greatest: "(\<And>i. i \<in> A \<Longrightarrow> u \<le> f i) \<Longrightarrow> u \<le> (\<Sqinter>i\<in>A. f i)"
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  using Inf_greatest [of "f ` A"] by auto
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   141
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lemma SUP_upper: "i \<in> A \<Longrightarrow> f i \<le> (\<Squnion>i\<in>A. f i)"
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  using Sup_upper [of _ "f ` A"] by simp
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   144
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lemma SUP_least: "(\<And>i. i \<in> A \<Longrightarrow> f i \<le> u) \<Longrightarrow> (\<Squnion>i\<in>A. f i) \<le> u"
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   146
  using Sup_least [of "f ` A"] by auto
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   147
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lemma Inf_lower2: "u \<in> A \<Longrightarrow> u \<le> v \<Longrightarrow> \<Sqinter>A \<le> v"
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  using Inf_lower [of u A] by auto
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   150
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lemma INF_lower2: "i \<in> A \<Longrightarrow> f i \<le> u \<Longrightarrow> (\<Sqinter>i\<in>A. f i) \<le> u"
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   152
  using INF_lower [of i A f] by auto
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   153
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lemma Sup_upper2: "u \<in> A \<Longrightarrow> v \<le> u \<Longrightarrow> v \<le> \<Squnion>A"
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   155
  using Sup_upper [of u A] by auto
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   156
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lemma SUP_upper2: "i \<in> A \<Longrightarrow> u \<le> f i \<Longrightarrow> u \<le> (\<Squnion>i\<in>A. f i)"
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   158
  using SUP_upper [of i A f] by auto
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   159
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   160
lemma le_Inf_iff: "b \<le> \<Sqinter>A \<longleftrightarrow> (\<forall>a\<in>A. b \<le> a)"
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   161
  by (auto intro: Inf_greatest dest: Inf_lower)
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   162
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lemma le_INF_iff: "u \<le> (\<Sqinter>i\<in>A. f i) \<longleftrightarrow> (\<forall>i\<in>A. u \<le> f i)"
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   164
  using le_Inf_iff [of _ "f ` A"] by simp
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   165
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   166
lemma Sup_le_iff: "\<Squnion>A \<le> b \<longleftrightarrow> (\<forall>a\<in>A. a \<le> b)"
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   167
  by (auto intro: Sup_least dest: Sup_upper)
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   168
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lemma SUP_le_iff: "(\<Squnion>i\<in>A. f i) \<le> u \<longleftrightarrow> (\<forall>i\<in>A. f i \<le> u)"
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  using Sup_le_iff [of "f ` A"] by simp
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   171
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   172
lemma Inf_insert [simp]: "\<Sqinter>(insert a A) = a \<sqinter> \<Sqinter>A"
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   173
  by (auto intro: le_infI le_infI1 le_infI2 order.antisym Inf_greatest Inf_lower)
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   174
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   175
lemma INF_insert: "(\<Sqinter>x\<in>insert a A. f x) = f a \<sqinter> \<Sqinter>(f ` A)"
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   176
  by simp
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   177
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lemma Sup_insert [simp]: "\<Squnion>(insert a A) = a \<squnion> \<Squnion>A"
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   179
  by (auto intro: le_supI le_supI1 le_supI2 order.antisym Sup_least Sup_upper)
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   180
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   181
lemma SUP_insert: "(\<Squnion>x\<in>insert a A. f x) = f a \<squnion> \<Squnion>(f ` A)"
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  by simp
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   183
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   184
lemma INF_empty: "(\<Sqinter>x\<in>{}. f x) = \<top>"
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  by simp
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   186
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lemma SUP_empty: "(\<Squnion>x\<in>{}. f x) = \<bottom>"
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   188
  by simp
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   189
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lemma Inf_UNIV [simp]: "\<Sqinter>UNIV = \<bottom>"
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  by (auto intro!: order.antisym Inf_lower)
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   192
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lemma Sup_UNIV [simp]: "\<Squnion>UNIV = \<top>"
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  by (auto intro!: order.antisym Sup_upper)
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   195
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   196
lemma Inf_eq_Sup: "\<Sqinter>A = \<Squnion>{b. \<forall>a \<in> A. b \<le> a}"
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  by (auto intro: order.antisym Inf_lower Inf_greatest Sup_upper Sup_least)
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   198
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   199
lemma Sup_eq_Inf:  "\<Squnion>A = \<Sqinter>{b. \<forall>a \<in> A. a \<le> b}"
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  by (auto intro: order.antisym Inf_lower Inf_greatest Sup_upper Sup_least)
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   201
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   202
lemma Inf_superset_mono: "B \<subseteq> A \<Longrightarrow> \<Sqinter>A \<le> \<Sqinter>B"
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   203
  by (auto intro: Inf_greatest Inf_lower)
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   204
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lemma Sup_subset_mono: "A \<subseteq> B \<Longrightarrow> \<Squnion>A \<le> \<Squnion>B"
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   206
  by (auto intro: Sup_least Sup_upper)
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   207
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   208
lemma Inf_mono:
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  assumes "\<And>b. b \<in> B \<Longrightarrow> \<exists>a\<in>A. a \<le> b"
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   210
  shows "\<Sqinter>A \<le> \<Sqinter>B"
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   211
proof (rule Inf_greatest)
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   212
  fix b assume "b \<in> B"
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   213
  with assms obtain a where "a \<in> A" and "a \<le> b" by blast
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   214
  from \<open>a \<in> A\<close> have "\<Sqinter>A \<le> a" by (rule Inf_lower)
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   215
  with \<open>a \<le> b\<close> show "\<Sqinter>A \<le> b" by auto
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   216
qed
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diff changeset
   217
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   218
lemma INF_mono: "(\<And>m. m \<in> B \<Longrightarrow> \<exists>n\<in>A. f n \<le> g m) \<Longrightarrow> (\<Sqinter>n\<in>A. f n) \<le> (\<Sqinter>n\<in>B. g n)"
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   219
  using Inf_mono [of "g ` B" "f ` A"] by auto
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   220
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   221
lemma INF_mono': "(\<And>x. f x \<le> g x) \<Longrightarrow> (\<Sqinter>x\<in>A. f x) \<le> (\<Sqinter>x\<in>A. g x)"
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   222
  by (rule INF_mono) auto
f443ec10447d Some basic materials on filters and topology
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diff changeset
   223
41082
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   224
lemma Sup_mono:
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  assumes "\<And>a. a \<in> A \<Longrightarrow> \<exists>b\<in>B. a \<le> b"
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   226
  shows "\<Squnion>A \<le> \<Squnion>B"
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   227
proof (rule Sup_least)
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   228
  fix a assume "a \<in> A"
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   229
  with assms obtain b where "b \<in> B" and "a \<le> b" by blast
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   230
  from \<open>b \<in> B\<close> have "b \<le> \<Squnion>B" by (rule Sup_upper)
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   231
  with \<open>a \<le> b\<close> show "a \<le> \<Squnion>B" by auto
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   232
qed
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   233
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   234
lemma SUP_mono: "(\<And>n. n \<in> A \<Longrightarrow> \<exists>m\<in>B. f n \<le> g m) \<Longrightarrow> (\<Squnion>n\<in>A. f n) \<le> (\<Squnion>n\<in>B. g n)"
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   235
  using Sup_mono [of "f ` A" "g ` B"] by auto
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   236
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   237
lemma SUP_mono': "(\<And>x. f x \<le> g x) \<Longrightarrow> (\<Squnion>x\<in>A. f x) \<le> (\<Squnion>x\<in>A. g x)"
68860
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Manuel Eberl <eberlm@in.tum.de>
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   238
  by (rule SUP_mono) auto
f443ec10447d Some basic materials on filters and topology
Manuel Eberl <eberlm@in.tum.de>
parents: 68802
diff changeset
   239
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   240
lemma INF_superset_mono: "B \<subseteq> A \<Longrightarrow> (\<And>x. x \<in> B \<Longrightarrow> f x \<le> g x) \<Longrightarrow> (\<Sqinter>x\<in>A. f x) \<le> (\<Sqinter>x\<in>B. g x)"
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
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diff changeset
   241
  \<comment> \<open>The last inclusion is POSITIVE!\<close>
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diff changeset
   242
  by (blast intro: INF_mono dest: subsetD)
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diff changeset
   243
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   244
lemma SUP_subset_mono: "A \<subseteq> B \<Longrightarrow> (\<And>x. x \<in> A \<Longrightarrow> f x \<le> g x) \<Longrightarrow> (\<Squnion>x\<in>A. f x) \<le> (\<Squnion>x\<in>B. g x)"
44041
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diff changeset
   245
  by (blast intro: SUP_mono dest: subsetD)
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haftmann
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diff changeset
   246
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   247
lemma Inf_less_eq:
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   248
  assumes "\<And>v. v \<in> A \<Longrightarrow> v \<le> u"
43868
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   249
    and "A \<noteq> {}"
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   250
  shows "\<Sqinter>A \<le> u"
43868
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haftmann
parents: 43867
diff changeset
   251
proof -
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parents: 60585
diff changeset
   252
  from \<open>A \<noteq> {}\<close> obtain v where "v \<in> A" by blast
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diff changeset
   253
  moreover from \<open>v \<in> A\<close> assms(1) have "v \<le> u" by blast
43868
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diff changeset
   254
  ultimately show ?thesis by (rule Inf_lower2)
9684251c7ec1 more lemmas about Sup
haftmann
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diff changeset
   255
qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   256
9684251c7ec1 more lemmas about Sup
haftmann
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diff changeset
   257
lemma less_eq_Sup:
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diff changeset
   258
  assumes "\<And>v. v \<in> A \<Longrightarrow> u \<le> v"
43868
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diff changeset
   259
    and "A \<noteq> {}"
63820
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haftmann
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diff changeset
   260
  shows "u \<le> \<Squnion>A"
43868
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haftmann
parents: 43867
diff changeset
   261
proof -
60758
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wenzelm
parents: 60585
diff changeset
   262
  from \<open>A \<noteq> {}\<close> obtain v where "v \<in> A" by blast
63820
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diff changeset
   263
  moreover from \<open>v \<in> A\<close> assms(1) have "u \<le> v" by blast
43868
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haftmann
parents: 43867
diff changeset
   264
  ultimately show ?thesis by (rule Sup_upper2)
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   265
qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   266
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   267
lemma INF_eq:
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
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diff changeset
   268
  assumes "\<And>i. i \<in> A \<Longrightarrow> \<exists>j\<in>B. f i \<ge> g j"
63575
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diff changeset
   269
    and "\<And>j. j \<in> B \<Longrightarrow> \<exists>i\<in>A. g j \<ge> f i"
68797
haftmann
parents: 68796
diff changeset
   270
  shows "\<Sqinter>(f ` A) = \<Sqinter>(g ` B)"
73411
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parents: 71238
diff changeset
   271
  by (intro order.antisym INF_greatest) (blast intro: INF_lower2 dest: assms)+
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   272
56212
3253aaf73a01 consolidated theorem names containing INFI and SUPR: have INF and SUP instead uniformly
haftmann
parents: 56166
diff changeset
   273
lemma SUP_eq:
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   274
  assumes "\<And>i. i \<in> A \<Longrightarrow> \<exists>j\<in>B. f i \<le> g j"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   275
    and "\<And>j. j \<in> B \<Longrightarrow> \<exists>i\<in>A. g j \<le> f i"
68797
haftmann
parents: 68796
diff changeset
   276
  shows "\<Squnion>(f ` A) = \<Squnion>(g ` B)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   277
  by (intro order.antisym SUP_least) (blast intro: SUP_upper2 dest: assms)+
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   278
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   279
lemma less_eq_Inf_inter: "\<Sqinter>A \<squnion> \<Sqinter>B \<le> \<Sqinter>(A \<inter> B)"
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   280
  by (auto intro: Inf_greatest Inf_lower)
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   281
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   282
lemma Sup_inter_less_eq: "\<Squnion>(A \<inter> B) \<le> \<Squnion>A \<sqinter> \<Squnion>B "
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   283
  by (auto intro: Sup_least Sup_upper)
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   284
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   285
lemma Inf_union_distrib: "\<Sqinter>(A \<union> B) = \<Sqinter>A \<sqinter> \<Sqinter>B"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   286
  by (rule order.antisym) (auto intro: Inf_greatest Inf_lower le_infI1 le_infI2)
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   287
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   288
lemma INF_union: "(\<Sqinter>i \<in> A \<union> B. M i) = (\<Sqinter>i \<in> A. M i) \<sqinter> (\<Sqinter>i\<in>B. M i)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   289
  by (auto intro!: order.antisym INF_mono intro: le_infI1 le_infI2 INF_greatest INF_lower)
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   290
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   291
lemma Sup_union_distrib: "\<Squnion>(A \<union> B) = \<Squnion>A \<squnion> \<Squnion>B"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   292
  by (rule order.antisym) (auto intro: Sup_least Sup_upper le_supI1 le_supI2)
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   293
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   294
lemma SUP_union: "(\<Squnion>i \<in> A \<union> B. M i) = (\<Squnion>i \<in> A. M i) \<squnion> (\<Squnion>i\<in>B. M i)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   295
  by (auto intro!: order.antisym SUP_mono intro: le_supI1 le_supI2 SUP_least SUP_upper)
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   296
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   297
lemma INF_inf_distrib: "(\<Sqinter>a\<in>A. f a) \<sqinter> (\<Sqinter>a\<in>A. g a) = (\<Sqinter>a\<in>A. f a \<sqinter> g a)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   298
  by (rule order.antisym) (rule INF_greatest, auto intro: le_infI1 le_infI2 INF_lower INF_mono)
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   299
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   300
lemma SUP_sup_distrib: "(\<Squnion>a\<in>A. f a) \<squnion> (\<Squnion>a\<in>A. g a) = (\<Squnion>a\<in>A. f a \<squnion> g a)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   301
  (is "?L = ?R")
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   302
proof (rule order.antisym)
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   303
  show "?L \<le> ?R"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   304
    by (auto intro: le_supI1 le_supI2 SUP_upper SUP_mono)
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   305
  show "?R \<le> ?L"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   306
    by (rule SUP_least) (auto intro: le_supI1 le_supI2 SUP_upper)
44918
6a80fbc4e72c tune simpset for Complete_Lattices
noschinl
parents: 44860
diff changeset
   307
qed
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   308
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   309
lemma Inf_top_conv [simp]:
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   310
  "\<Sqinter>A = \<top> \<longleftrightarrow> (\<forall>x\<in>A. x = \<top>)"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   311
  "\<top> = \<Sqinter>A \<longleftrightarrow> (\<forall>x\<in>A. x = \<top>)"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   312
proof -
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   313
  show "\<Sqinter>A = \<top> \<longleftrightarrow> (\<forall>x\<in>A. x = \<top>)"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   314
  proof
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   315
    assume "\<forall>x\<in>A. x = \<top>"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   316
    then have "A = {} \<or> A = {\<top>}" by auto
44919
482f1807976e tune proofs
noschinl
parents: 44918
diff changeset
   317
    then show "\<Sqinter>A = \<top>" by auto
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   318
  next
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   319
    assume "\<Sqinter>A = \<top>"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   320
    show "\<forall>x\<in>A. x = \<top>"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   321
    proof (rule ccontr)
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   322
      assume "\<not> (\<forall>x\<in>A. x = \<top>)"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   323
      then obtain x where "x \<in> A" and "x \<noteq> \<top>" by blast
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   324
      then obtain B where "A = insert x B" by blast
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   325
      with \<open>\<Sqinter>A = \<top>\<close> \<open>x \<noteq> \<top>\<close> show False by simp
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   326
    qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   327
  qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   328
  then show "\<top> = \<Sqinter>A \<longleftrightarrow> (\<forall>x\<in>A. x = \<top>)" by auto
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   329
qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   330
44918
6a80fbc4e72c tune simpset for Complete_Lattices
noschinl
parents: 44860
diff changeset
   331
lemma INF_top_conv [simp]:
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   332
  "(\<Sqinter>x\<in>A. B x) = \<top> \<longleftrightarrow> (\<forall>x\<in>A. B x = \<top>)"
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   333
  "\<top> = (\<Sqinter>x\<in>A. B x) \<longleftrightarrow> (\<forall>x\<in>A. B x = \<top>)"
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   334
  using Inf_top_conv [of "B ` A"] by simp_all
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   335
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   336
lemma Sup_bot_conv [simp]:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   337
  "\<Squnion>A = \<bottom> \<longleftrightarrow> (\<forall>x\<in>A. x = \<bottom>)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   338
  "\<bottom> = \<Squnion>A \<longleftrightarrow> (\<forall>x\<in>A. x = \<bottom>)"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   339
  using dual_complete_lattice
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   340
  by (rule complete_lattice.Inf_top_conv)+
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   341
44918
6a80fbc4e72c tune simpset for Complete_Lattices
noschinl
parents: 44860
diff changeset
   342
lemma SUP_bot_conv [simp]:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   343
  "(\<Squnion>x\<in>A. B x) = \<bottom> \<longleftrightarrow> (\<forall>x\<in>A. B x = \<bottom>)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   344
  "\<bottom> = (\<Squnion>x\<in>A. B x) \<longleftrightarrow> (\<forall>x\<in>A. B x = \<bottom>)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   345
  using Sup_bot_conv [of "B ` A"] by simp_all
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   346
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   347
lemma INF_constant: "(\<Sqinter>y\<in>A. c) = (if A = {} then \<top> else c)"
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   348
  by (auto intro: order.antisym INF_lower INF_greatest)
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   349
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   350
lemma SUP_constant: "(\<Squnion>y\<in>A. c) = (if A = {} then \<bottom> else c)"
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   351
  by (auto intro: order.antisym SUP_upper SUP_least)
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   352
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   353
lemma INF_const [simp]: "A \<noteq> {} \<Longrightarrow> (\<Sqinter>i\<in>A. f) = f"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   354
  by (simp add: INF_constant)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   355
43870
92129f505125 structuring duals together
haftmann
parents: 43868
diff changeset
   356
lemma SUP_const [simp]: "A \<noteq> {} \<Longrightarrow> (\<Squnion>i\<in>A. f) = f"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   357
  by (simp add: SUP_constant)
43870
92129f505125 structuring duals together
haftmann
parents: 43868
diff changeset
   358
44918
6a80fbc4e72c tune simpset for Complete_Lattices
noschinl
parents: 44860
diff changeset
   359
lemma INF_top [simp]: "(\<Sqinter>x\<in>A. \<top>) = \<top>"
44921
58eef4843641 tuned proofs
huffman
parents: 44920
diff changeset
   360
  by (cases "A = {}") simp_all
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
   361
44918
6a80fbc4e72c tune simpset for Complete_Lattices
noschinl
parents: 44860
diff changeset
   362
lemma SUP_bot [simp]: "(\<Squnion>x\<in>A. \<bottom>) = \<bottom>"
44921
58eef4843641 tuned proofs
huffman
parents: 44920
diff changeset
   363
  by (cases "A = {}") simp_all
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
   364
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   365
lemma INF_commute: "(\<Sqinter>i\<in>A. \<Sqinter>j\<in>B. f i j) = (\<Sqinter>j\<in>B. \<Sqinter>i\<in>A. f i j)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   366
  by (iprover intro: INF_lower INF_greatest order_trans order.antisym)
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   367
43870
92129f505125 structuring duals together
haftmann
parents: 43868
diff changeset
   368
lemma SUP_commute: "(\<Squnion>i\<in>A. \<Squnion>j\<in>B. f i j) = (\<Squnion>j\<in>B. \<Squnion>i\<in>A. f i j)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   369
  by (iprover intro: SUP_upper SUP_least order_trans order.antisym)
43870
92129f505125 structuring duals together
haftmann
parents: 43868
diff changeset
   370
43871
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   371
lemma INF_absorb:
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   372
  assumes "k \<in> I"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   373
  shows "A k \<sqinter> (\<Sqinter>i\<in>I. A i) = (\<Sqinter>i\<in>I. A i)"
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   374
proof -
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   375
  from assms obtain J where "I = insert k J" by blast
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   376
  then show ?thesis by simp
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   377
qed
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   378
43871
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   379
lemma SUP_absorb:
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   380
  assumes "k \<in> I"
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   381
  shows "A k \<squnion> (\<Squnion>i\<in>I. A i) = (\<Squnion>i\<in>I. A i)"
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   382
proof -
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   383
  from assms obtain J where "I = insert k J" by blast
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   384
  then show ?thesis by simp
43871
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   385
qed
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   386
67613
ce654b0e6d69 more symbols;
wenzelm
parents: 67399
diff changeset
   387
lemma INF_inf_const1: "I \<noteq> {} \<Longrightarrow> (\<Sqinter>i\<in>I. inf x (f i)) = inf x (\<Sqinter>i\<in>I. f i)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   388
  by (intro order.antisym INF_greatest inf_mono order_refl INF_lower)
57448
159e45728ceb more equalities of topological filters; strengthen dependent_nat_choice; tuned a couple of proofs
hoelzl
parents: 57197
diff changeset
   389
     (auto intro: INF_lower2 le_infI2 intro!: INF_mono)
159e45728ceb more equalities of topological filters; strengthen dependent_nat_choice; tuned a couple of proofs
hoelzl
parents: 57197
diff changeset
   390
67613
ce654b0e6d69 more symbols;
wenzelm
parents: 67399
diff changeset
   391
lemma INF_inf_const2: "I \<noteq> {} \<Longrightarrow> (\<Sqinter>i\<in>I. inf (f i) x) = inf (\<Sqinter>i\<in>I. f i) x"
57448
159e45728ceb more equalities of topological filters; strengthen dependent_nat_choice; tuned a couple of proofs
hoelzl
parents: 57197
diff changeset
   392
  using INF_inf_const1[of I x f] by (simp add: inf_commute)
159e45728ceb more equalities of topological filters; strengthen dependent_nat_choice; tuned a couple of proofs
hoelzl
parents: 57197
diff changeset
   393
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   394
lemma less_INF_D:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   395
  assumes "y < (\<Sqinter>i\<in>A. f i)" "i \<in> A"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   396
  shows "y < f i"
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   397
proof -
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   398
  note \<open>y < (\<Sqinter>i\<in>A. f i)\<close>
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   399
  also have "(\<Sqinter>i\<in>A. f i) \<le> f i" using \<open>i \<in> A\<close>
44103
cedaca00789f more uniform naming scheme for Inf/INF and Sup/SUP lemmas
haftmann
parents: 44085
diff changeset
   400
    by (rule INF_lower)
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   401
  finally show "y < f i" .
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   402
qed
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   403
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   404
lemma SUP_lessD:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   405
  assumes "(\<Squnion>i\<in>A. f i) < y" "i \<in> A"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   406
  shows "f i < y"
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   407
proof -
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   408
  have "f i \<le> (\<Squnion>i\<in>A. f i)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   409
    using \<open>i \<in> A\<close> by (rule SUP_upper)
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   410
  also note \<open>(\<Squnion>i\<in>A. f i) < y\<close>
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   411
  finally show "f i < y" .
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   412
qed
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   413
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   414
lemma INF_UNIV_bool_expand: "(\<Sqinter>b. A b) = A True \<sqinter> A False"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   415
  by (simp add: UNIV_bool inf_commute)
43868
9684251c7ec1 more lemmas about Sup
haftmann
parents: 43867
diff changeset
   416
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   417
lemma SUP_UNIV_bool_expand: "(\<Squnion>b. A b) = A True \<squnion> A False"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   418
  by (simp add: UNIV_bool sup_commute)
43871
79c3231e0593 more lemmas about SUP
haftmann
parents: 43870
diff changeset
   419
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   420
lemma Inf_le_Sup: "A \<noteq> {} \<Longrightarrow> Inf A \<le> Sup A"
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   421
  by (blast intro: Sup_upper2 Inf_lower ex_in_conv)
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   422
68797
haftmann
parents: 68796
diff changeset
   423
lemma INF_le_SUP: "A \<noteq> {} \<Longrightarrow> \<Sqinter>(f ` A) \<le> \<Squnion>(f ` A)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   424
  using Inf_le_Sup [of "f ` A"] by simp
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   425
68797
haftmann
parents: 68796
diff changeset
   426
lemma INF_eq_const: "I \<noteq> {} \<Longrightarrow> (\<And>i. i \<in> I \<Longrightarrow> f i = x) \<Longrightarrow> \<Sqinter>(f ` I) = x"
54414
72949fae4f81 add equalities for SUP and INF over constant functions
hoelzl
parents: 54259
diff changeset
   427
  by (auto intro: INF_eqI)
72949fae4f81 add equalities for SUP and INF over constant functions
hoelzl
parents: 54259
diff changeset
   428
68797
haftmann
parents: 68796
diff changeset
   429
lemma SUP_eq_const: "I \<noteq> {} \<Longrightarrow> (\<And>i. i \<in> I \<Longrightarrow> f i = x) \<Longrightarrow> \<Squnion>(f ` I) = x"
56248
67dc9549fa15 generalized and strengthened cong rules on compound operators, similar to 1ed737a98198
haftmann
parents: 56218
diff changeset
   430
  by (auto intro: SUP_eqI)
54414
72949fae4f81 add equalities for SUP and INF over constant functions
hoelzl
parents: 54259
diff changeset
   431
68797
haftmann
parents: 68796
diff changeset
   432
lemma INF_eq_iff: "I \<noteq> {} \<Longrightarrow> (\<And>i. i \<in> I \<Longrightarrow> f i \<le> c) \<Longrightarrow> \<Sqinter>(f ` I) = c \<longleftrightarrow> (\<forall>i\<in>I. f i = c)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   433
  by (auto intro: INF_eq_const INF_lower order.antisym)
56248
67dc9549fa15 generalized and strengthened cong rules on compound operators, similar to 1ed737a98198
haftmann
parents: 56218
diff changeset
   434
68797
haftmann
parents: 68796
diff changeset
   435
lemma SUP_eq_iff: "I \<noteq> {} \<Longrightarrow> (\<And>i. i \<in> I \<Longrightarrow> c \<le> f i) \<Longrightarrow> \<Squnion>(f ` I) = c \<longleftrightarrow> (\<forall>i\<in>I. f i = c)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   436
  by (auto intro: SUP_eq_const SUP_upper order.antisym)
54414
72949fae4f81 add equalities for SUP and INF over constant functions
hoelzl
parents: 54259
diff changeset
   437
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   438
end
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   439
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   440
context complete_lattice
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   441
begin
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   442
lemma Sup_Inf_le: "Sup (Inf ` {f ` A | f . (\<forall> Y \<in> A . f Y \<in> Y)}) \<le> Inf (Sup ` A)"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   443
  by (rule SUP_least, clarify, rule INF_greatest, simp add: INF_lower2 Sup_upper)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   444
end 
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
   445
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   446
class complete_distrib_lattice = complete_lattice +
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   447
  assumes Inf_Sup_le: "Inf (Sup ` A) \<le> Sup (Inf ` {f ` A | f . (\<forall> Y \<in> A . f Y \<in> Y)})"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   448
begin
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   449
  
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   450
lemma Inf_Sup: "Inf (Sup ` A) = Sup (Inf ` {f ` A | f . (\<forall> Y \<in> A . f Y \<in> Y)})"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   451
  by (rule order.antisym, rule Inf_Sup_le, rule Sup_Inf_le)
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   452
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   453
subclass distrib_lattice
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   454
proof
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   455
  fix a b c
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   456
  show "a \<squnion> b \<sqinter> c = (a \<squnion> b) \<sqinter> (a \<squnion> c)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   457
  proof (rule order.antisym, simp_all, safe)
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   458
    show "b \<sqinter> c \<le> a \<squnion> b"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   459
      by (rule le_infI1, simp)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   460
    show "b \<sqinter> c \<le> a \<squnion> c"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   461
      by (rule le_infI2, simp)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   462
    have [simp]: "a \<sqinter> c \<le> a \<squnion> b \<sqinter> c"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   463
      by (rule le_infI1, simp)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   464
    have [simp]: "b \<sqinter> a \<le> a \<squnion> b \<sqinter> c"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   465
      by (rule le_infI2, simp)
68797
haftmann
parents: 68796
diff changeset
   466
    have "\<Sqinter>(Sup ` {{a, b}, {a, c}}) =
haftmann
parents: 68796
diff changeset
   467
      \<Squnion>(Inf ` {f ` {{a, b}, {a, c}} | f. \<forall>Y\<in>{{a, b}, {a, c}}. f Y \<in> Y})"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   468
      by (rule Inf_Sup)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   469
    from this show "(a \<squnion> b) \<sqinter> (a \<squnion> c) \<le> a \<squnion> b \<sqinter> c"
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   470
      apply simp
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   471
      by (rule SUP_least, safe, simp_all)
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   472
  qed
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   473
qed
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   474
end
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
   475
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   476
context complete_lattice
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   477
begin
56074
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   478
context
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   479
  fixes f :: "'a \<Rightarrow> 'b::complete_lattice"
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   480
  assumes "mono f"
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   481
begin
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   482
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   483
lemma mono_Inf: "f (\<Sqinter>A) \<le> (\<Sqinter>x\<in>A. f x)"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   484
  using \<open>mono f\<close> by (auto intro: complete_lattice_class.INF_greatest Inf_lower dest: monoD)
56074
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   485
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   486
lemma mono_Sup: "(\<Squnion>x\<in>A. f x) \<le> f (\<Squnion>A)"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   487
  using \<open>mono f\<close> by (auto intro: complete_lattice_class.SUP_least Sup_upper dest: monoD)
56074
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   488
67613
ce654b0e6d69 more symbols;
wenzelm
parents: 67399
diff changeset
   489
lemma mono_INF: "f (\<Sqinter>i\<in>I. A i) \<le> (\<Sqinter>x\<in>I. f (A x))"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   490
  by (intro complete_lattice_class.INF_greatest monoD[OF \<open>mono f\<close>] INF_lower)
60172
423273355b55 rename continuous and down_continuous in Order_Continuity to sup_/inf_continuous; relate them with topological continuity
hoelzl
parents: 58889
diff changeset
   491
67613
ce654b0e6d69 more symbols;
wenzelm
parents: 67399
diff changeset
   492
lemma mono_SUP: "(\<Squnion>x\<in>I. f (A x)) \<le> f (\<Squnion>i\<in>I. A i)"
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   493
  by (intro complete_lattice_class.SUP_least monoD[OF \<open>mono f\<close>] SUP_upper)
60172
423273355b55 rename continuous and down_continuous in Order_Continuity to sup_/inf_continuous; relate them with topological continuity
hoelzl
parents: 58889
diff changeset
   494
56074
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   495
end
30a60277aa6e monotonicity in complete lattices
haftmann
parents: 56015
diff changeset
   496
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   497
end
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   498
44032
cb768f4ceaf9 solving duality problem for complete_distrib_lattice; tuned
haftmann
parents: 44029
diff changeset
   499
class complete_boolean_algebra = boolean_algebra + complete_distrib_lattice
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   500
begin
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   501
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   502
lemma uminus_Inf: "- (\<Sqinter>A) = \<Squnion>(uminus ` A)"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   503
proof (rule order.antisym)
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   504
  show "- \<Sqinter>A \<le> \<Squnion>(uminus ` A)"
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   505
    by (rule compl_le_swap2, rule Inf_greatest, rule compl_le_swap2, rule Sup_upper) simp
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   506
  show "\<Squnion>(uminus ` A) \<le> - \<Sqinter>A"
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   507
    by (rule Sup_least, rule compl_le_swap1, rule Inf_lower) auto
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   508
qed
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   509
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   510
lemma uminus_INF: "- (\<Sqinter>x\<in>A. B x) = (\<Squnion>x\<in>A. - B x)"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   511
  by (simp add: uminus_Inf image_image)
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   512
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   513
lemma uminus_Sup: "- (\<Squnion>A) = \<Sqinter>(uminus ` A)"
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   514
proof -
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   515
  have "\<Squnion>A = - \<Sqinter>(uminus ` A)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   516
    by (simp add: image_image uminus_INF)
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   517
  then show ?thesis by simp
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   518
qed
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   519
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   520
lemma uminus_SUP: "- (\<Squnion>x\<in>A. B x) = (\<Sqinter>x\<in>A. - B x)"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   521
  by (simp add: uminus_Sup image_image)
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   522
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   523
end
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   524
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   525
class complete_linorder = linorder + complete_lattice
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   526
begin
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   527
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   528
lemma dual_complete_linorder:
67399
eab6ce8368fa ran isabelle update_op on all sources
nipkow
parents: 64966
diff changeset
   529
  "class.complete_linorder Sup Inf sup (\<ge>) (>) inf \<top> \<bottom>"
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   530
  by (rule class.complete_linorder.intro, rule dual_complete_lattice, rule dual_linorder)
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   531
51386
616f68ddcb7f generalized subclass relation;
haftmann
parents: 51341
diff changeset
   532
lemma complete_linorder_inf_min: "inf = min"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   533
  by (auto intro: order.antisym simp add: min_def fun_eq_iff)
51386
616f68ddcb7f generalized subclass relation;
haftmann
parents: 51341
diff changeset
   534
616f68ddcb7f generalized subclass relation;
haftmann
parents: 51341
diff changeset
   535
lemma complete_linorder_sup_max: "sup = max"
73411
1f1366966296 avoid name clash
haftmann
parents: 71238
diff changeset
   536
  by (auto intro: order.antisym simp add: max_def fun_eq_iff)
51386
616f68ddcb7f generalized subclass relation;
haftmann
parents: 51341
diff changeset
   537
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   538
lemma Inf_less_iff: "\<Sqinter>S < a \<longleftrightarrow> (\<exists>x\<in>S. x < a)"
63172
d4f459eb7ed0 tuned proofs;
wenzelm
parents: 63099
diff changeset
   539
  by (simp add: not_le [symmetric] le_Inf_iff)
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   540
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   541
lemma INF_less_iff: "(\<Sqinter>i\<in>A. f i) < a \<longleftrightarrow> (\<exists>x\<in>A. f x < a)"
63172
d4f459eb7ed0 tuned proofs;
wenzelm
parents: 63099
diff changeset
   542
  by (simp add: Inf_less_iff [of "f ` A"])
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   543
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   544
lemma less_Sup_iff: "a < \<Squnion>S \<longleftrightarrow> (\<exists>x\<in>S. a < x)"
63172
d4f459eb7ed0 tuned proofs;
wenzelm
parents: 63099
diff changeset
   545
  by (simp add: not_le [symmetric] Sup_le_iff)
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   546
63820
9f004fbf9d5c discontinued theory-local special syntax for lattice orderings
haftmann
parents: 63576
diff changeset
   547
lemma less_SUP_iff: "a < (\<Squnion>i\<in>A. f i) \<longleftrightarrow> (\<exists>x\<in>A. a < f x)"
63172
d4f459eb7ed0 tuned proofs;
wenzelm
parents: 63099
diff changeset
   548
  by (simp add: less_Sup_iff [of _ "f ` A"])
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   549
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   550
lemma Sup_eq_top_iff [simp]: "\<Squnion>A = \<top> \<longleftrightarrow> (\<forall>x<\<top>. \<exists>i\<in>A. x < i)"
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   551
proof
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   552
  assume *: "\<Squnion>A = \<top>"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   553
  show "(\<forall>x<\<top>. \<exists>i\<in>A. x < i)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   554
    unfolding * [symmetric]
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   555
  proof (intro allI impI)
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   556
    fix x
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   557
    assume "x < \<Squnion>A"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   558
    then show "\<exists>i\<in>A. x < i"
63172
d4f459eb7ed0 tuned proofs;
wenzelm
parents: 63099
diff changeset
   559
      by (simp add: less_Sup_iff)
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   560
  qed
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   561
next
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   562
  assume *: "\<forall>x<\<top>. \<exists>i\<in>A. x < i"
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   563
  show "\<Squnion>A = \<top>"
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   564
  proof (rule ccontr)
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   565
    assume "\<Squnion>A \<noteq> \<top>"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   566
    with top_greatest [of "\<Squnion>A"] have "\<Squnion>A < \<top>"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   567
      unfolding le_less by auto
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   568
    with * have "\<Squnion>A < \<Squnion>A"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   569
      unfolding less_Sup_iff by auto
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   570
    then show False by auto
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   571
  qed
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   572
qed
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   573
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   574
lemma SUP_eq_top_iff [simp]: "(\<Squnion>i\<in>A. f i) = \<top> \<longleftrightarrow> (\<forall>x<\<top>. \<exists>i\<in>A. x < f i)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   575
  using Sup_eq_top_iff [of "f ` A"] by simp
44041
01d6ab227069 tuned order: pushing INF and SUP to Inf and Sup
haftmann
parents: 44040
diff changeset
   576
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   577
lemma Inf_eq_bot_iff [simp]: "\<Sqinter>A = \<bottom> \<longleftrightarrow> (\<forall>x>\<bottom>. \<exists>i\<in>A. i < x)"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   578
  using dual_complete_linorder
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   579
  by (rule complete_linorder.Sup_eq_top_iff)
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
   580
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   581
lemma INF_eq_bot_iff [simp]: "(\<Sqinter>i\<in>A. f i) = \<bottom> \<longleftrightarrow> (\<forall>x>\<bottom>. \<exists>i\<in>A. f i < x)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   582
  using Inf_eq_bot_iff [of "f ` A"] by simp
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   583
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   584
lemma Inf_le_iff: "\<Sqinter>A \<le> x \<longleftrightarrow> (\<forall>y>x. \<exists>a\<in>A. y > a)"
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   585
proof safe
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   586
  fix y
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   587
  assume "x \<ge> \<Sqinter>A" "y > x"
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   588
  then have "y > \<Sqinter>A" by auto
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   589
  then show "\<exists>a\<in>A. y > a"
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   590
    unfolding Inf_less_iff .
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   591
qed (auto elim!: allE[of _ "\<Sqinter>A"] simp add: not_le[symmetric] Inf_lower)
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   592
68802
3974935e0252 some modernization of notation
haftmann
parents: 68801
diff changeset
   593
lemma INF_le_iff: "\<Sqinter>(f ` A) \<le> x \<longleftrightarrow> (\<forall>y>x. \<exists>i\<in>A. y > f i)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   594
  using Inf_le_iff [of "f ` A"] by simp
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   595
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   596
lemma le_Sup_iff: "x \<le> \<Squnion>A \<longleftrightarrow> (\<forall>y<x. \<exists>a\<in>A. y < a)"
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   597
proof safe
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   598
  fix y
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   599
  assume "x \<le> \<Squnion>A" "y < x"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   600
  then have "y < \<Squnion>A" by auto
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   601
  then show "\<exists>a\<in>A. y < a"
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   602
    unfolding less_Sup_iff .
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   603
qed (auto elim!: allE[of _ "\<Squnion>A"] simp add: not_le[symmetric] Sup_upper)
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   604
68802
3974935e0252 some modernization of notation
haftmann
parents: 68801
diff changeset
   605
lemma le_SUP_iff: "x \<le> \<Squnion>(f ` A) \<longleftrightarrow> (\<forall>y<x. \<exists>i\<in>A. y < f i)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   606
  using le_Sup_iff [of _ "f ` A"] by simp
51328
d63ec23c9125 move auxiliary lemmas from Library/Extended_Reals to HOL image
hoelzl
parents: 49905
diff changeset
   607
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   608
end
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   609
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   610
subsection \<open>Complete lattice on \<^typ>\<open>bool\<close>\<close>
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   611
44024
de7642fcbe1e class complete_distrib_lattice
haftmann
parents: 43967
diff changeset
   612
instantiation bool :: complete_lattice
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   613
begin
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   614
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   615
definition [simp, code]: "\<Sqinter>A \<longleftrightarrow> False \<notin> A"
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   616
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   617
definition [simp, code]: "\<Squnion>A \<longleftrightarrow> True \<in> A"
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   618
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   619
instance
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   620
  by standard (auto intro: bool_induct)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   621
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   622
end
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   623
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   624
lemma not_False_in_image_Ball [simp]: "False \<notin> P ` A \<longleftrightarrow> Ball A P"
49905
a81f95693c68 simp results for simplification results of Inf/Sup expressions on bool;
haftmann
parents: 46884
diff changeset
   625
  by auto
a81f95693c68 simp results for simplification results of Inf/Sup expressions on bool;
haftmann
parents: 46884
diff changeset
   626
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   627
lemma True_in_image_Bex [simp]: "True \<in> P ` A \<longleftrightarrow> Bex A P"
49905
a81f95693c68 simp results for simplification results of Inf/Sup expressions on bool;
haftmann
parents: 46884
diff changeset
   628
  by auto
a81f95693c68 simp results for simplification results of Inf/Sup expressions on bool;
haftmann
parents: 46884
diff changeset
   629
68802
3974935e0252 some modernization of notation
haftmann
parents: 68801
diff changeset
   630
lemma INF_bool_eq [simp]: "(\<lambda>A f. \<Sqinter>(f ` A)) = Ball"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   631
  by (simp add: fun_eq_iff)
32120
53a21a5e6889 attempt for more concise setup of non-etacontracting binders
haftmann
parents: 32117
diff changeset
   632
68802
3974935e0252 some modernization of notation
haftmann
parents: 68801
diff changeset
   633
lemma SUP_bool_eq [simp]: "(\<lambda>A f. \<Squnion>(f ` A)) = Bex"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   634
  by (simp add: fun_eq_iff)
32120
53a21a5e6889 attempt for more concise setup of non-etacontracting binders
haftmann
parents: 32117
diff changeset
   635
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   636
instance bool :: complete_boolean_algebra
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
   637
  by (standard, fastforce)
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   638
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   639
subsection \<open>Complete lattice on \<^typ>\<open>_ \<Rightarrow> _\<close>\<close>
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   640
57197
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   641
instantiation "fun" :: (type, Inf) Inf
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   642
begin
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   643
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   644
definition "\<Sqinter>A = (\<lambda>x. \<Sqinter>f\<in>A. f x)"
41080
294956ff285b nice syntax for lattice INFI, SUPR;
haftmann
parents: 40872
diff changeset
   645
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   646
lemma Inf_apply [simp, code]: "(\<Sqinter>A) x = (\<Sqinter>f\<in>A. f x)"
41080
294956ff285b nice syntax for lattice INFI, SUPR;
haftmann
parents: 40872
diff changeset
   647
  by (simp add: Inf_fun_def)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   648
57197
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   649
instance ..
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   650
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   651
end
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   652
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   653
instantiation "fun" :: (type, Sup) Sup
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   654
begin
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   655
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   656
definition "\<Squnion>A = (\<lambda>x. \<Squnion>f\<in>A. f x)"
41080
294956ff285b nice syntax for lattice INFI, SUPR;
haftmann
parents: 40872
diff changeset
   657
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   658
lemma Sup_apply [simp, code]: "(\<Squnion>A) x = (\<Squnion>f\<in>A. f x)"
41080
294956ff285b nice syntax for lattice INFI, SUPR;
haftmann
parents: 40872
diff changeset
   659
  by (simp add: Sup_fun_def)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   660
57197
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   661
instance ..
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   662
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   663
end
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   664
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   665
instantiation "fun" :: (type, complete_lattice) complete_lattice
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   666
begin
4cf607675df8 Sup/Inf on functions decoupled from complete_lattice.
nipkow
parents: 56742
diff changeset
   667
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   668
instance
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   669
  by standard (auto simp add: le_fun_def intro: INF_lower INF_greatest SUP_upper SUP_least)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   670
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   671
end
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   672
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   673
lemma INF_apply [simp]: "(\<Sqinter>y\<in>A. f y) x = (\<Sqinter>y\<in>A. f y x)"
69861
62e47f06d22c avoid context-sensitive simp rules whose context-free form (image_comp) is not simp by default
haftmann
parents: 69768
diff changeset
   674
  by (simp add: image_comp)
38705
aaee86c0e237 moved generic lemmas in Probability to HOL
hoelzl
parents: 37767
diff changeset
   675
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   676
lemma SUP_apply [simp]: "(\<Squnion>y\<in>A. f y) x = (\<Squnion>y\<in>A. f y x)"
69861
62e47f06d22c avoid context-sensitive simp rules whose context-free form (image_comp) is not simp by default
haftmann
parents: 69768
diff changeset
   677
  by (simp add: image_comp)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
   678
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   679
subsection \<open>Complete lattice on unary and binary predicates\<close>
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   680
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   681
lemma Inf1_I: "(\<And>P. P \<in> A \<Longrightarrow> P a) \<Longrightarrow> (\<Sqinter>A) a"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   682
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   683
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   684
lemma INF1_I: "(\<And>x. x \<in> A \<Longrightarrow> B x b) \<Longrightarrow> (\<Sqinter>x\<in>A. B x) b"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   685
  by simp
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   686
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   687
lemma INF2_I: "(\<And>x. x \<in> A \<Longrightarrow> B x b c) \<Longrightarrow> (\<Sqinter>x\<in>A. B x) b c"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   688
  by simp
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   689
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   690
lemma Inf2_I: "(\<And>r. r \<in> A \<Longrightarrow> r a b) \<Longrightarrow> (\<Sqinter>A) a b"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   691
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   692
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   693
lemma Inf1_D: "(\<Sqinter>A) a \<Longrightarrow> P \<in> A \<Longrightarrow> P a"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   694
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   695
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   696
lemma INF1_D: "(\<Sqinter>x\<in>A. B x) b \<Longrightarrow> a \<in> A \<Longrightarrow> B a b"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   697
  by simp
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   698
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   699
lemma Inf2_D: "(\<Sqinter>A) a b \<Longrightarrow> r \<in> A \<Longrightarrow> r a b"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   700
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   701
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   702
lemma INF2_D: "(\<Sqinter>x\<in>A. B x) b c \<Longrightarrow> a \<in> A \<Longrightarrow> B a b c"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   703
  by simp
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   704
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   705
lemma Inf1_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   706
  assumes "(\<Sqinter>A) a"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   707
  obtains "P a" | "P \<notin> A"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   708
  using assms by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   709
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   710
lemma INF1_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   711
  assumes "(\<Sqinter>x\<in>A. B x) b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   712
  obtains "B a b" | "a \<notin> A"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   713
  using assms by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   714
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   715
lemma Inf2_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   716
  assumes "(\<Sqinter>A) a b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   717
  obtains "r a b" | "r \<notin> A"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   718
  using assms by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   719
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   720
lemma INF2_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   721
  assumes "(\<Sqinter>x\<in>A. B x) b c"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   722
  obtains "B a b c" | "a \<notin> A"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   723
  using assms by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   724
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   725
lemma Sup1_I: "P \<in> A \<Longrightarrow> P a \<Longrightarrow> (\<Squnion>A) a"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   726
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   727
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   728
lemma SUP1_I: "a \<in> A \<Longrightarrow> B a b \<Longrightarrow> (\<Squnion>x\<in>A. B x) b"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   729
  by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   730
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   731
lemma Sup2_I: "r \<in> A \<Longrightarrow> r a b \<Longrightarrow> (\<Squnion>A) a b"
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   732
  by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   733
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   734
lemma SUP2_I: "a \<in> A \<Longrightarrow> B a b c \<Longrightarrow> (\<Squnion>x\<in>A. B x) b c"
46884
154dc6ec0041 tuned proofs
noschinl
parents: 46882
diff changeset
   735
  by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   736
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   737
lemma Sup1_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   738
  assumes "(\<Squnion>A) a"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   739
  obtains P where "P \<in> A" and "P a"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   740
  using assms by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   741
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   742
lemma SUP1_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   743
  assumes "(\<Squnion>x\<in>A. B x) b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   744
  obtains x where "x \<in> A" and "B x b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   745
  using assms by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   746
56742
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   747
lemma Sup2_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   748
  assumes "(\<Squnion>A) a b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   749
  obtains r where "r \<in> A" "r a b"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   750
  using assms by auto
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   751
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   752
lemma SUP2_E:
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   753
  assumes "(\<Squnion>x\<in>A. B x) b c"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   754
  obtains x where "x \<in> A" "B x b c"
678a52e676b6 more complete classical rules for Inf and Sup, modelled after theiry counterparts on Inter and Union (and INF and SUP)
haftmann
parents: 56741
diff changeset
   755
  using assms by auto
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   756
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   757
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   758
subsection \<open>Complete lattice on \<^typ>\<open>_ set\<close>\<close>
46631
2c5c003cee35 moved lemmas for orderings and lattices on predicates to corresponding theories, retaining declaration order of classical rules; tuned headings; tuned syntax
haftmann
parents: 46557
diff changeset
   759
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   760
instantiation "set" :: (type) complete_lattice
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   761
begin
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   762
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   763
definition "\<Sqinter>A = {x. \<Sqinter>((\<lambda>B. x \<in> B) ` A)}"
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   764
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   765
definition "\<Squnion>A = {x. \<Squnion>((\<lambda>B. x \<in> B) ` A)}"
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   766
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   767
instance
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   768
  by standard (auto simp add: less_eq_set_def Inf_set_def Sup_set_def le_fun_def)
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   769
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   770
end
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   771
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   772
subsubsection \<open>Inter\<close>
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   773
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
   774
abbreviation Inter :: "'a set set \<Rightarrow> 'a set"  ("\<Inter>")
61952
546958347e05 prefer symbols for "Union", "Inter";
wenzelm
parents: 61799
diff changeset
   775
  where "\<Inter>S \<equiv> \<Sqinter>S"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   776
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   777
lemma Inter_eq: "\<Inter>A = {x. \<forall>B \<in> A. x \<in> B}"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   778
proof (rule set_eqI)
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   779
  fix x
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   780
  have "(\<forall>Q\<in>{P. \<exists>B\<in>A. P \<longleftrightarrow> x \<in> B}. Q) \<longleftrightarrow> (\<forall>B\<in>A. x \<in> B)"
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   781
    by auto
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   782
  then show "x \<in> \<Inter>A \<longleftrightarrow> x \<in> {x. \<forall>B \<in> A. x \<in> B}"
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   783
    by (simp add: Inf_set_def image_def)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   784
qed
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   785
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   786
lemma Inter_iff [simp]: "A \<in> \<Inter>C \<longleftrightarrow> (\<forall>X\<in>C. A \<in> X)"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   787
  by (unfold Inter_eq) blast
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   788
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   789
lemma InterI [intro!]: "(\<And>X. X \<in> C \<Longrightarrow> A \<in> X) \<Longrightarrow> A \<in> \<Inter>C"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   790
  by (simp add: Inter_eq)
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   791
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   792
text \<open>
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   793
  \<^medskip> A ``destruct'' rule -- every \<^term>\<open>X\<close> in \<^term>\<open>C\<close>
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   794
  contains \<^term>\<open>A\<close> as an element, but \<^prop>\<open>A \<in> X\<close> can hold when
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   795
  \<^prop>\<open>X \<in> C\<close> does not!  This rule is analogous to \<open>spec\<close>.
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   796
\<close>
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   797
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   798
lemma InterD [elim, Pure.elim]: "A \<in> \<Inter>C \<Longrightarrow> X \<in> C \<Longrightarrow> A \<in> X"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   799
  by auto
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   800
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   801
lemma InterE [elim]: "A \<in> \<Inter>C \<Longrightarrow> (X \<notin> C \<Longrightarrow> R) \<Longrightarrow> (A \<in> X \<Longrightarrow> R) \<Longrightarrow> R"
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
   802
  \<comment> \<open>``Classical'' elimination rule -- does not require proving
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   803
    \<^prop>\<open>X \<in> C\<close>.\<close>
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   804
  unfolding Inter_eq by blast
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   805
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   806
lemma Inter_lower: "B \<in> A \<Longrightarrow> \<Inter>A \<subseteq> B"
43740
3316e6831801 more succinct proofs
haftmann
parents: 43739
diff changeset
   807
  by (fact Inf_lower)
3316e6831801 more succinct proofs
haftmann
parents: 43739
diff changeset
   808
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   809
lemma Inter_subset: "(\<And>X. X \<in> A \<Longrightarrow> X \<subseteq> B) \<Longrightarrow> A \<noteq> {} \<Longrightarrow> \<Inter>A \<subseteq> B"
43740
3316e6831801 more succinct proofs
haftmann
parents: 43739
diff changeset
   810
  by (fact Inf_less_eq)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   811
61952
546958347e05 prefer symbols for "Union", "Inter";
wenzelm
parents: 61799
diff changeset
   812
lemma Inter_greatest: "(\<And>X. X \<in> A \<Longrightarrow> C \<subseteq> X) \<Longrightarrow> C \<subseteq> \<Inter>A"
43740
3316e6831801 more succinct proofs
haftmann
parents: 43739
diff changeset
   813
  by (fact Inf_greatest)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   814
44067
5feac96f0e78 declare {INF,SUP}_empty [simp]
huffman
parents: 44041
diff changeset
   815
lemma Inter_empty: "\<Inter>{} = UNIV"
5feac96f0e78 declare {INF,SUP}_empty [simp]
huffman
parents: 44041
diff changeset
   816
  by (fact Inf_empty) (* already simp *)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   817
44067
5feac96f0e78 declare {INF,SUP}_empty [simp]
huffman
parents: 44041
diff changeset
   818
lemma Inter_UNIV: "\<Inter>UNIV = {}"
5feac96f0e78 declare {INF,SUP}_empty [simp]
huffman
parents: 44041
diff changeset
   819
  by (fact Inf_UNIV) (* already simp *)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   820
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   821
lemma Inter_insert: "\<Inter>(insert a B) = a \<inter> \<Inter>B"
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   822
  by (fact Inf_insert) (* already simp *)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   823
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   824
lemma Inter_Un_subset: "\<Inter>A \<union> \<Inter>B \<subseteq> \<Inter>(A \<inter> B)"
43899
60ef6abb2f92 avoid misunderstandable names
haftmann
parents: 43898
diff changeset
   825
  by (fact less_eq_Inf_inter)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   826
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   827
lemma Inter_Un_distrib: "\<Inter>(A \<union> B) = \<Inter>A \<inter> \<Inter>B"
43756
15ea1a07a8cf tuned proofs
haftmann
parents: 43755
diff changeset
   828
  by (fact Inf_union_distrib)
15ea1a07a8cf tuned proofs
haftmann
parents: 43755
diff changeset
   829
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   830
lemma Inter_UNIV_conv [simp]:
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   831
  "\<Inter>A = UNIV \<longleftrightarrow> (\<forall>x\<in>A. x = UNIV)"
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   832
  "UNIV = \<Inter>A \<longleftrightarrow> (\<forall>x\<in>A. x = UNIV)"
43801
097732301fc0 more generalization towards complete lattices
haftmann
parents: 43756
diff changeset
   833
  by (fact Inf_top_conv)+
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   834
43741
fac11b64713c tuned proofs and notation
haftmann
parents: 43740
diff changeset
   835
lemma Inter_anti_mono: "B \<subseteq> A \<Longrightarrow> \<Inter>A \<subseteq> \<Inter>B"
43899
60ef6abb2f92 avoid misunderstandable names
haftmann
parents: 43898
diff changeset
   836
  by (fact Inf_superset_mono)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   837
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   838
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   839
subsubsection \<open>Intersections of families\<close>
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   840
61955
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
   841
syntax (ASCII)
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
   842
  "_INTER1"     :: "pttrns \<Rightarrow> 'b set \<Rightarrow> 'b set"           ("(3INT _./ _)" [0, 10] 10)
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
   843
  "_INTER"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b set \<Rightarrow> 'b set"  ("(3INT _:_./ _)" [0, 0, 10] 10)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   844
69274
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
   845
syntax
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
   846
  "_INTER1"     :: "pttrns \<Rightarrow> 'b set \<Rightarrow> 'b set"           ("(3\<Inter>_./ _)" [0, 10] 10)
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
   847
  "_INTER"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b set \<Rightarrow> 'b set"  ("(3\<Inter>_\<in>_./ _)" [0, 0, 10] 10)
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
   848
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   849
syntax (latex output)
62789
ce15dd971965 explicit property for unbreakable block;
wenzelm
parents: 62390
diff changeset
   850
  "_INTER1"     :: "pttrns \<Rightarrow> 'b set \<Rightarrow> 'b set"           ("(3\<Inter>(\<open>unbreakable\<close>\<^bsub>_\<^esub>)/ _)" [0, 10] 10)
ce15dd971965 explicit property for unbreakable block;
wenzelm
parents: 62390
diff changeset
   851
  "_INTER"      :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b set \<Rightarrow> 'b set"  ("(3\<Inter>(\<open>unbreakable\<close>\<^bsub>_\<in>_\<^esub>)/ _)" [0, 0, 10] 10)
61955
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
   852
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   853
translations
68796
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility
haftmann
parents: 68795
diff changeset
   854
  "\<Inter>x y. f"  \<rightleftharpoons> "\<Inter>x. \<Inter>y. f"
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
   855
  "\<Inter>x. f"    \<rightleftharpoons> "\<Inter>(CONST range (\<lambda>x. f))"
68796
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility
haftmann
parents: 68795
diff changeset
   856
  "\<Inter>x\<in>A. f"  \<rightleftharpoons> "CONST Inter ((\<lambda>x. f) ` A)"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   857
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   858
lemma INTER_eq: "(\<Inter>x\<in>A. B x) = {y. \<forall>x\<in>A. y \<in> B x}"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   859
  by (auto intro!: INF_eqI)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   860
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   861
lemma INT_iff [simp]: "b \<in> (\<Inter>x\<in>A. B x) \<longleftrightarrow> (\<forall>x\<in>A. b \<in> B x)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
   862
  using Inter_iff [of _ "B ` A"] by simp
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   863
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   864
lemma INT_I [intro!]: "(\<And>x. x \<in> A \<Longrightarrow> b \<in> B x) \<Longrightarrow> b \<in> (\<Inter>x\<in>A. B x)"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   865
  by auto
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   866
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
   867
lemma INT_D [elim, Pure.elim]: "b \<in> (\<Inter>x\<in>A. B x) \<Longrightarrow> a \<in> A \<Longrightarrow> b \<in> B a"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   868
  by auto
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   869
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
   870
lemma INT_E [elim]: "b \<in> (\<Inter>x\<in>A. B x) \<Longrightarrow> (b \<in> B a \<Longrightarrow> R) \<Longrightarrow> (a \<notin> A \<Longrightarrow> R) \<Longrightarrow> R"
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   871
  \<comment> \<open>"Classical" elimination -- by the Excluded Middle on \<^prop>\<open>a\<in>A\<close>.\<close>
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
   872
  by auto
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   873
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   874
lemma Collect_ball_eq: "{x. \<forall>y\<in>A. P x y} = (\<Inter>y\<in>A. {x. P x y})"
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   875
  by blast
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   876
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   877
lemma Collect_all_eq: "{x. \<forall>y. P x y} = (\<Inter>y. {x. P x y})"
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   878
  by blast
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   879
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   880
lemma INT_lower: "a \<in> A \<Longrightarrow> (\<Inter>x\<in>A. B x) \<subseteq> B a"
44103
cedaca00789f more uniform naming scheme for Inf/INF and Sup/SUP lemmas
haftmann
parents: 44085
diff changeset
   881
  by (fact INF_lower)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   882
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   883
lemma INT_greatest: "(\<And>x. x \<in> A \<Longrightarrow> C \<subseteq> B x) \<Longrightarrow> C \<subseteq> (\<Inter>x\<in>A. B x)"
44103
cedaca00789f more uniform naming scheme for Inf/INF and Sup/SUP lemmas
haftmann
parents: 44085
diff changeset
   884
  by (fact INF_greatest)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   885
44067
5feac96f0e78 declare {INF,SUP}_empty [simp]
huffman
parents: 44041
diff changeset
   886
lemma INT_empty: "(\<Inter>x\<in>{}. B x) = UNIV"
44085
a65e26f1427b move legacy candiates to bottom; marked candidates for default simp rules
haftmann
parents: 44084
diff changeset
   887
  by (fact INF_empty)
43854
f1d23df1adde generalized some lemmas
haftmann
parents: 43853
diff changeset
   888
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   889
lemma INT_absorb: "k \<in> I \<Longrightarrow> A k \<inter> (\<Inter>i\<in>I. A i) = (\<Inter>i\<in>I. A i)"
43872
6b917e5877d2 more consistent theorem names
haftmann
parents: 43871
diff changeset
   890
  by (fact INF_absorb)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   891
43854
f1d23df1adde generalized some lemmas
haftmann
parents: 43853
diff changeset
   892
lemma INT_subset_iff: "B \<subseteq> (\<Inter>i\<in>I. A i) \<longleftrightarrow> (\<forall>i\<in>I. B \<subseteq> A i)"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   893
  by (fact le_INF_iff)
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   894
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
   895
lemma INT_insert [simp]: "(\<Inter>x \<in> insert a A. B x) = B a \<inter> \<Inter> (B ` A)"
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   896
  by (fact INF_insert)
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   897
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   898
lemma INT_Un: "(\<Inter>i \<in> A \<union> B. M i) = (\<Inter>i \<in> A. M i) \<inter> (\<Inter>i\<in>B. M i)"
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   899
  by (fact INF_union)
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   900
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   901
lemma INT_insert_distrib: "u \<in> A \<Longrightarrow> (\<Inter>x\<in>A. insert a (B x)) = insert a (\<Inter>x\<in>A. B x)"
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   902
  by blast
43854
f1d23df1adde generalized some lemmas
haftmann
parents: 43853
diff changeset
   903
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   904
lemma INT_constant [simp]: "(\<Inter>y\<in>A. c) = (if A = {} then UNIV else c)"
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   905
  by (fact INF_constant)
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   906
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   907
lemma INTER_UNIV_conv:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   908
  "(UNIV = (\<Inter>x\<in>A. B x)) = (\<forall>x\<in>A. B x = UNIV)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   909
  "((\<Inter>x\<in>A. B x) = UNIV) = (\<forall>x\<in>A. B x = UNIV)"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   910
  by (fact INF_top_conv)+ (* already simp *)
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   911
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   912
lemma INT_bool_eq: "(\<Inter>b. A b) = A True \<inter> A False"
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
   913
  by (fact INF_UNIV_bool_expand)
43865
db18f4d0cc7d further generalization from sets to complete lattices
haftmann
parents: 43854
diff changeset
   914
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   915
lemma INT_anti_mono: "A \<subseteq> B \<Longrightarrow> (\<And>x. x \<in> A \<Longrightarrow> f x \<subseteq> g x) \<Longrightarrow> (\<Inter>x\<in>B. f x) \<subseteq> (\<Inter>x\<in>A. g x)"
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
   916
  \<comment> \<open>The last inclusion is POSITIVE!\<close>
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
   917
  by (fact INF_superset_mono)
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   918
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   919
lemma Pow_INT_eq: "Pow (\<Inter>x\<in>A. B x) = (\<Inter>x\<in>A. Pow (B x))"
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   920
  by blast
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   921
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   922
lemma vimage_INT: "f -` (\<Inter>x\<in>A. B x) = (\<Inter>x\<in>A. f -` B x)"
41082
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   923
  by blast
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   924
9ff94e7cc3b3 bot comes before top, inf before sup etc.
haftmann
parents: 41080
diff changeset
   925
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
   926
subsubsection \<open>Union\<close>
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   927
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
   928
abbreviation Union :: "'a set set \<Rightarrow> 'a set"  ("\<Union>")
61952
546958347e05 prefer symbols for "Union", "Inter";
wenzelm
parents: 61799
diff changeset
   929
  where "\<Union>S \<equiv> \<Squnion>S"
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   930
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   931
lemma Union_eq: "\<Union>A = {x. \<exists>B \<in> A. x \<in> B}"
39302
d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI
nipkow
parents: 38705
diff changeset
   932
proof (rule set_eqI)
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   933
  fix x
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   934
  have "(\<exists>Q\<in>{P. \<exists>B\<in>A. P \<longleftrightarrow> x \<in> B}. Q) \<longleftrightarrow> (\<exists>B\<in>A. x \<in> B)"
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   935
    by auto
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   936
  then show "x \<in> \<Union>A \<longleftrightarrow> x \<in> {x. \<exists>B\<in>A. x \<in> B}"
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
   937
    by (simp add: Sup_set_def image_def)
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   938
qed
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   939
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   940
lemma Union_iff [simp]: "A \<in> \<Union>C \<longleftrightarrow> (\<exists>X\<in>C. A\<in>X)"
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   941
  by (unfold Union_eq) blast
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   942
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   943
lemma UnionI [intro]: "X \<in> C \<Longrightarrow> A \<in> X \<Longrightarrow> A \<in> \<Union>C"
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   944
  \<comment> \<open>The order of the premises presupposes that \<^term>\<open>C\<close> is rigid;
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
   945
    \<^term>\<open>A\<close> may be flexible.\<close>
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   946
  by auto
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   947
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
   948
lemma UnionE [elim!]: "A \<in> \<Union>C \<Longrightarrow> (\<And>X. A \<in> X \<Longrightarrow> X \<in> C \<Longrightarrow> R) \<Longrightarrow> R"
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   949
  by auto
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   950
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   951
lemma Union_upper: "B \<in> A \<Longrightarrow> B \<subseteq> \<Union>A"
43901
3ab6c30d256d proof tuning
haftmann
parents: 43900
diff changeset
   952
  by (fact Sup_upper)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   953
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   954
lemma Union_least: "(\<And>X. X \<in> A \<Longrightarrow> X \<subseteq> C) \<Longrightarrow> \<Union>A \<subseteq> C"
43901
3ab6c30d256d proof tuning
haftmann
parents: 43900
diff changeset
   955
  by (fact Sup_least)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   956
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   957
lemma Union_empty: "\<Union>{} = {}"
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   958
  by (fact Sup_empty) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   959
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   960
lemma Union_UNIV: "\<Union>UNIV = UNIV"
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   961
  by (fact Sup_UNIV) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   962
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
   963
lemma Union_insert: "\<Union>(insert a B) = a \<union> \<Union>B"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   964
  by (fact Sup_insert) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   965
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   966
lemma Union_Un_distrib [simp]: "\<Union>(A \<union> B) = \<Union>A \<union> \<Union>B"
43901
3ab6c30d256d proof tuning
haftmann
parents: 43900
diff changeset
   967
  by (fact Sup_union_distrib)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   968
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   969
lemma Union_Int_subset: "\<Union>(A \<inter> B) \<subseteq> \<Union>A \<inter> \<Union>B"
43901
3ab6c30d256d proof tuning
haftmann
parents: 43900
diff changeset
   970
  by (fact Sup_inter_less_eq)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   971
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   972
lemma Union_empty_conv: "(\<Union>A = {}) \<longleftrightarrow> (\<forall>x\<in>A. x = {})"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   973
  by (fact Sup_bot_conv) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   974
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
   975
lemma empty_Union_conv: "({} = \<Union>A) \<longleftrightarrow> (\<forall>x\<in>A. x = {})"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
   976
  by (fact Sup_bot_conv) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   977
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   978
lemma subset_Pow_Union: "A \<subseteq> Pow (\<Union>A)"
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   979
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   980
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   981
lemma Union_Pow_eq [simp]: "\<Union>(Pow A) = A"
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   982
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   983
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
   984
lemma Union_mono: "A \<subseteq> B \<Longrightarrow> \<Union>A \<subseteq> \<Union>B"
43901
3ab6c30d256d proof tuning
haftmann
parents: 43900
diff changeset
   985
  by (fact Sup_subset_mono)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
   986
63469
b6900858dcb9 lots of new theorems about differentiable_on, retracts, ANRs, etc.
paulson <lp15@cam.ac.uk>
parents: 63365
diff changeset
   987
lemma Union_subsetI: "(\<And>x. x \<in> A \<Longrightarrow> \<exists>y. y \<in> B \<and> x \<subseteq> y) \<Longrightarrow> \<Union>A \<subseteq> \<Union>B"
b6900858dcb9 lots of new theorems about differentiable_on, retracts, ANRs, etc.
paulson <lp15@cam.ac.uk>
parents: 63365
diff changeset
   988
  by blast
32115
8f10fb3bb46e swapped bootstrap order of UNION/Union and INTER/Inter in theory Set
haftmann
parents: 32082
diff changeset
   989
63879
15bbf6360339 simple new lemmas, mostly about sets
paulson <lp15@cam.ac.uk>
parents: 63820
diff changeset
   990
lemma disjnt_inj_on_iff:
15bbf6360339 simple new lemmas, mostly about sets
paulson <lp15@cam.ac.uk>
parents: 63820
diff changeset
   991
     "\<lbrakk>inj_on f (\<Union>\<A>); X \<in> \<A>; Y \<in> \<A>\<rbrakk> \<Longrightarrow> disjnt (f ` X) (f ` Y) \<longleftrightarrow> disjnt X Y"
15bbf6360339 simple new lemmas, mostly about sets
paulson <lp15@cam.ac.uk>
parents: 63820
diff changeset
   992
  apply (auto simp: disjnt_def)
15bbf6360339 simple new lemmas, mostly about sets
paulson <lp15@cam.ac.uk>
parents: 63820
diff changeset
   993
  using inj_on_eq_iff by fastforce
15bbf6360339 simple new lemmas, mostly about sets
paulson <lp15@cam.ac.uk>
parents: 63820
diff changeset
   994
69986
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
   995
lemma disjnt_Union1 [simp]: "disjnt (\<Union>\<A>) B \<longleftrightarrow> (\<forall>A \<in> \<A>. disjnt A B)"
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
   996
  by (auto simp: disjnt_def)
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
   997
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
   998
lemma disjnt_Union2 [simp]: "disjnt B (\<Union>\<A>) \<longleftrightarrow> (\<forall>A \<in> \<A>. disjnt B A)"
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
   999
  by (auto simp: disjnt_def)
f2d327275065 generalised homotopic_with to topologies; homotopic_with_canon is the old version
paulson <lp15@cam.ac.uk>
parents: 69861
diff changeset
  1000
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1001
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1002
subsubsection \<open>Unions of families\<close>
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1003
61955
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
  1004
syntax (ASCII)
35115
446c5063e4fd modernized translations;
wenzelm
parents: 34007
diff changeset
  1005
  "_UNION1"     :: "pttrns => 'b set => 'b set"           ("(3UN _./ _)" [0, 10] 10)
36364
0e2679025aeb fix syntax precedence declarations for UNION, INTER, SUP, INF
huffman
parents: 35828
diff changeset
  1006
  "_UNION"      :: "pttrn => 'a set => 'b set => 'b set"  ("(3UN _:_./ _)" [0, 0, 10] 10)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1007
69274
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
  1008
syntax
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
  1009
  "_UNION1"     :: "pttrns => 'b set => 'b set"           ("(3\<Union>_./ _)" [0, 10] 10)
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
  1010
  "_UNION"      :: "pttrn => 'a set => 'b set => 'b set"  ("(3\<Union>_\<in>_./ _)" [0, 0, 10] 10)
ff7e6751a1a7 clarified status of ancient ASCII syntax for big union and inter
haftmann
parents: 69260
diff changeset
  1011
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1012
syntax (latex output)
62789
ce15dd971965 explicit property for unbreakable block;
wenzelm
parents: 62390
diff changeset
  1013
  "_UNION1"     :: "pttrns => 'b set => 'b set"           ("(3\<Union>(\<open>unbreakable\<close>\<^bsub>_\<^esub>)/ _)" [0, 10] 10)
ce15dd971965 explicit property for unbreakable block;
wenzelm
parents: 62390
diff changeset
  1014
  "_UNION"      :: "pttrn => 'a set => 'b set => 'b set"  ("(3\<Union>(\<open>unbreakable\<close>\<^bsub>_\<in>_\<^esub>)/ _)" [0, 0, 10] 10)
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1015
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1016
translations
68796
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility
haftmann
parents: 68795
diff changeset
  1017
  "\<Union>x y. f"   \<rightleftharpoons> "\<Union>x. \<Union>y. f"
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
  1018
  "\<Union>x. f"     \<rightleftharpoons> "\<Union>(CONST range (\<lambda>x. f))"
68796
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility
haftmann
parents: 68795
diff changeset
  1019
  "\<Union>x\<in>A. f"   \<rightleftharpoons> "CONST Union ((\<lambda>x. f) ` A)"
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1020
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1021
text \<open>
61955
e96292f32c3c former "xsymbols" syntax is used by default, and ASCII replacement syntax with print mode "ASCII";
wenzelm
parents: 61952
diff changeset
  1022
  Note the difference between ordinary syntax of indexed
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1023
  unions and intersections (e.g.\ \<open>\<Union>a\<^sub>1\<in>A\<^sub>1. B\<close>)
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
  1024
  and their \LaTeX\ rendition: \<^term>\<open>\<Union>a\<^sub>1\<in>A\<^sub>1. B\<close>.
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1025
\<close>
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1026
67673
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1027
lemma disjoint_UN_iff: "disjnt A (\<Union>i\<in>I. B i) \<longleftrightarrow> (\<forall>i\<in>I. disjnt A (B i))"
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1028
  by (auto simp: disjnt_def)
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1029
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1030
lemma UNION_eq: "(\<Union>x\<in>A. B x) = {y. \<exists>x\<in>A. y \<in> B x}"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
  1031
  by (auto intro!: SUP_eqI)
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
  1032
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1033
lemma bind_UNION [code]: "Set.bind A f = \<Union>(f ` A)"
45960
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
  1034
  by (simp add: bind_def UNION_eq)
e1b09bfb52f1 lattice type class instances for `set`; added code lemma for Set.bind
haftmann
parents: 45013
diff changeset
  1035
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1036
lemma member_bind [simp]: "x \<in> Set.bind A f \<longleftrightarrow> x \<in> \<Union>(f ` A)"
46036
6a86cc88b02f fundamental theorems on Set.bind
haftmann
parents: 45960
diff changeset
  1037
  by (simp add: bind_UNION)
6a86cc88b02f fundamental theorems on Set.bind
haftmann
parents: 45960
diff changeset
  1038
60585
48fdff264eb2 tuned whitespace;
wenzelm
parents: 60307
diff changeset
  1039
lemma Union_SetCompr_eq: "\<Union>{f x| x. P x} = {a. \<exists>x. P x \<and> a \<in> f x}"
60307
75e1aa7a450e Convex hulls: theorems about interior, etc. And a few simple lemmas.
paulson <lp15@cam.ac.uk>
parents: 60172
diff changeset
  1040
  by blast
75e1aa7a450e Convex hulls: theorems about interior, etc. And a few simple lemmas.
paulson <lp15@cam.ac.uk>
parents: 60172
diff changeset
  1041
46036
6a86cc88b02f fundamental theorems on Set.bind
haftmann
parents: 45960
diff changeset
  1042
lemma UN_iff [simp]: "b \<in> (\<Union>x\<in>A. B x) \<longleftrightarrow> (\<exists>x\<in>A. b \<in> B x)"
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
  1043
  using Union_iff [of _ "B ` A"] by simp
11979
0a3dace545c5 converted theory "Set";
wenzelm
parents: 11752
diff changeset
  1044
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1045
lemma UN_I [intro]: "a \<in> A \<Longrightarrow> b \<in> B a \<Longrightarrow> b \<in> (\<Union>x\<in>A. B x)"
69593
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
  1046
  \<comment> \<open>The order of the premises presupposes that \<^term>\<open>A\<close> is rigid;
3dda49e08b9d isabelle update -u control_cartouches;
wenzelm
parents: 69546
diff changeset
  1047
    \<^term>\<open>b\<close> may be flexible.\<close>
11979
0a3dace545c5 converted theory "Set";
wenzelm
parents: 11752
diff changeset
  1048
  by auto
0a3dace545c5 converted theory "Set";
wenzelm
parents: 11752
diff changeset
  1049
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1050
lemma UN_E [elim!]: "b \<in> (\<Union>x\<in>A. B x) \<Longrightarrow> (\<And>x. x\<in>A \<Longrightarrow> b \<in> B x \<Longrightarrow> R) \<Longrightarrow> R"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
  1051
  by auto
32077
3698947146b2 closer relation of sets and complete lattices; corresponding consts, defs and syntax at similar places in theory text
haftmann
parents: 32064
diff changeset
  1052
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1053
lemma UN_upper: "a \<in> A \<Longrightarrow> B a \<subseteq> (\<Union>x\<in>A. B x)"
44103
cedaca00789f more uniform naming scheme for Inf/INF and Sup/SUP lemmas
haftmann
parents: 44085
diff changeset
  1054
  by (fact SUP_upper)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1055
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1056
lemma UN_least: "(\<And>x. x \<in> A \<Longrightarrow> B x \<subseteq> C) \<Longrightarrow> (\<Union>x\<in>A. B x) \<subseteq> C"
44103
cedaca00789f more uniform naming scheme for Inf/INF and Sup/SUP lemmas
haftmann
parents: 44085
diff changeset
  1057
  by (fact SUP_least)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1058
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
  1059
lemma Collect_bex_eq: "{x. \<exists>y\<in>A. P x y} = (\<Union>y\<in>A. {x. P x y})"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1060
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1061
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1062
lemma UN_insert_distrib: "u \<in> A \<Longrightarrow> (\<Union>x\<in>A. insert a (B x)) = insert a (\<Union>x\<in>A. B x)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1063
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1064
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
  1065
lemma UN_empty: "(\<Union>x\<in>{}. B x) = {}"
44085
a65e26f1427b move legacy candiates to bottom; marked candidates for default simp rules
haftmann
parents: 44084
diff changeset
  1066
  by (fact SUP_empty)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1067
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
  1068
lemma UN_empty2: "(\<Union>x\<in>A. {}) = {}"
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
  1069
  by (fact SUP_bot) (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1070
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1071
lemma UN_absorb: "k \<in> I \<Longrightarrow> A k \<union> (\<Union>i\<in>I. A i) = (\<Union>i\<in>I. A i)"
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
  1072
  by (fact SUP_absorb)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1073
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1074
lemma UN_insert [simp]: "(\<Union>x\<in>insert a A. B x) = B a \<union> \<Union>(B ` A)"
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
  1075
  by (fact SUP_insert)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1076
44085
a65e26f1427b move legacy candiates to bottom; marked candidates for default simp rules
haftmann
parents: 44084
diff changeset
  1077
lemma UN_Un [simp]: "(\<Union>i \<in> A \<union> B. M i) = (\<Union>i\<in>A. M i) \<union> (\<Union>i\<in>B. M i)"
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
  1078
  by (fact SUP_union)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1079
43967
610efb6bda1f more coherent structure in and across theories
haftmann
parents: 43944
diff changeset
  1080
lemma UN_UN_flatten: "(\<Union>x \<in> (\<Union>y\<in>A. B y). C x) = (\<Union>y\<in>A. \<Union>x\<in>B y. C x)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1081
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1082
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1083
lemma UN_subset_iff: "((\<Union>i\<in>I. A i) \<subseteq> B) = (\<forall>i\<in>I. A i \<subseteq> B)"
35629
57f1a5e93b6b add some lemmas about complete lattices
huffman
parents: 35115
diff changeset
  1084
  by (fact SUP_le_iff)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1085
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1086
lemma UN_constant [simp]: "(\<Union>y\<in>A. c) = (if A = {} then {} else c)"
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
  1087
  by (fact SUP_constant)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1088
67673
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1089
lemma UNION_singleton_eq_range: "(\<Union>x\<in>A. {f x}) = f ` A"
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1090
  by blast
c8caefb20564 lots of new material, ultimately related to measure theory
paulson <lp15@cam.ac.uk>
parents: 67613
diff changeset
  1091
43944
b1b436f75070 dropped errorneous hint
haftmann
parents: 43943
diff changeset
  1092
lemma image_Union: "f ` \<Union>S = (\<Union>x\<in>S. f ` x)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1093
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1094
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
  1095
lemma UNION_empty_conv:
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1096
  "{} = (\<Union>x\<in>A. B x) \<longleftrightarrow> (\<forall>x\<in>A. B x = {})"
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1097
  "(\<Union>x\<in>A. B x) = {} \<longleftrightarrow> (\<forall>x\<in>A. B x = {})"
44920
4657b4c11138 remove some redundant [simp] declarations;
huffman
parents: 44919
diff changeset
  1098
  by (fact SUP_bot_conv)+ (* already simp *)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1099
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
  1100
lemma Collect_ex_eq: "{x. \<exists>y. P x y} = (\<Union>y. {x. P x y})"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1101
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1102
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1103
lemma ball_UN: "(\<forall>z \<in> \<Union>(B ` A). P z) \<longleftrightarrow> (\<forall>x\<in>A. \<forall>z \<in> B x. P z)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1104
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1105
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1106
lemma bex_UN: "(\<exists>z \<in> \<Union>(B ` A). P z) \<longleftrightarrow> (\<exists>x\<in>A. \<exists>z\<in>B x. P z)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1107
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1108
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1109
lemma Un_eq_UN: "A \<union> B = (\<Union>b. if b then A else B)"
62390
842917225d56 more canonical names
nipkow
parents: 62343
diff changeset
  1110
  by safe (auto simp add: if_split_mem2)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1111
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1112
lemma UN_bool_eq: "(\<Union>b. A b) = (A True \<union> A False)"
43900
7162691e740b generalization; various notation and proof tuning
haftmann
parents: 43899
diff changeset
  1113
  by (fact SUP_UNIV_bool_expand)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1114
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1115
lemma UN_Pow_subset: "(\<Union>x\<in>A. Pow (B x)) \<subseteq> Pow (\<Union>x\<in>A. B x)"
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1116
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1117
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1118
lemma UN_mono:
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1119
  "A \<subseteq> B \<Longrightarrow> (\<And>x. x \<in> A \<Longrightarrow> f x \<subseteq> g x) \<Longrightarrow>
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1120
    (\<Union>x\<in>A. f x) \<subseteq> (\<Union>x\<in>B. g x)"
43940
26ca0bad226a class complete_linorder
haftmann
parents: 43901
diff changeset
  1121
  by (fact SUP_subset_mono)
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1122
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1123
lemma vimage_Union: "f -` (\<Union>A) = (\<Union>X\<in>A. f -` X)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1124
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1125
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1126
lemma vimage_UN: "f -` (\<Union>x\<in>A. B x) = (\<Union>x\<in>A. f -` B x)"
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1127
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1128
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1129
lemma vimage_eq_UN: "f -` B = (\<Union>y\<in>B. f -` {y})"
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1130
  \<comment> \<open>NOT suitable for rewriting\<close>
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1131
  by blast
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1132
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1133
lemma image_UN: "f ` \<Union>(B ` A) = (\<Union>x\<in>A. f ` B x)"
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1134
  by blast
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1135
45013
05031b71a89a official status for UN_singleton
haftmann
parents: 44995
diff changeset
  1136
lemma UN_singleton [simp]: "(\<Union>x\<in>A. {x}) = A"
05031b71a89a official status for UN_singleton
haftmann
parents: 44995
diff changeset
  1137
  by blast
05031b71a89a official status for UN_singleton
haftmann
parents: 44995
diff changeset
  1138
67399
eab6ce8368fa ran isabelle update_op on all sources
nipkow
parents: 64966
diff changeset
  1139
lemma inj_on_image: "inj_on f (\<Union>A) \<Longrightarrow> inj_on ((`) f) A"
63099
af0e964aad7b Moved material from AFP/Randomised_Social_Choice to distribution
eberlm
parents: 62789
diff changeset
  1140
  unfolding inj_on_def by blast
11979
0a3dace545c5 converted theory "Set";
wenzelm
parents: 11752
diff changeset
  1141
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1142
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1143
subsubsection \<open>Distributive laws\<close>
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1144
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1145
lemma Int_Union: "A \<inter> \<Union>B = (\<Union>C\<in>B. A \<inter> C)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1146
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1147
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1148
lemma Un_Inter: "A \<union> \<Inter>B = (\<Inter>C\<in>B. A \<union> C)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1149
  by blast
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1150
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1151
lemma Int_Union2: "\<Union>B \<inter> A = (\<Union>C\<in>B. C \<inter> A)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1152
  by blast
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1153
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1154
lemma INT_Int_distrib: "(\<Inter>i\<in>I. A i \<inter> B i) = (\<Inter>i\<in>I. A i) \<inter> (\<Inter>i\<in>I. B i)"
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1155
  by (rule sym) (rule INF_inf_distrib)
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1156
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1157
lemma UN_Un_distrib: "(\<Union>i\<in>I. A i \<union> B i) = (\<Union>i\<in>I. A i) \<union> (\<Union>i\<in>I. B i)"
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1158
  by (rule sym) (rule SUP_sup_distrib)
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1159
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1160
lemma Int_Inter_image: "(\<Inter>x\<in>C. A x \<inter> B x) = \<Inter>(A ` C) \<inter> \<Inter>(B ` C)"  (* FIXME drop *)
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
  1161
  by (simp add: INT_Int_distrib)
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1162
69020
4f94e262976d elimination of near duplication involving Rolle's theorem and the MVT
paulson <lp15@cam.ac.uk>
parents: 68980
diff changeset
  1163
lemma Int_Inter_eq: "A \<inter> \<Inter>\<B> = (if \<B>={} then A else (\<Inter>B\<in>\<B>. A \<inter> B))"
4f94e262976d elimination of near duplication involving Rolle's theorem and the MVT
paulson <lp15@cam.ac.uk>
parents: 68980
diff changeset
  1164
                    "\<Inter>\<B> \<inter> A = (if \<B>={} then A else (\<Inter>B\<in>\<B>. B \<inter> A))"
4f94e262976d elimination of near duplication involving Rolle's theorem and the MVT
paulson <lp15@cam.ac.uk>
parents: 68980
diff changeset
  1165
  by auto
4f94e262976d elimination of near duplication involving Rolle's theorem and the MVT
paulson <lp15@cam.ac.uk>
parents: 68980
diff changeset
  1166
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1167
lemma Un_Union_image: "(\<Union>x\<in>C. A x \<union> B x) = \<Union>(A ` C) \<union> \<Union>(B ` C)"  (* FIXME drop *)
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1168
  \<comment> \<open>Devlin, Fundamentals of Contemporary Set Theory, page 12, exercise 5:\<close>
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1169
  \<comment> \<open>Union of a family of unions\<close>
56166
9a241bc276cd normalising simp rules for compound operators
haftmann
parents: 56076
diff changeset
  1170
  by (simp add: UN_Un_distrib)
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1171
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1172
lemma Un_INT_distrib: "B \<union> (\<Inter>i\<in>I. A i) = (\<Inter>i\<in>I. B \<union> A i)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1173
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1174
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1175
lemma Int_UN_distrib: "B \<inter> (\<Union>i\<in>I. A i) = (\<Union>i\<in>I. B \<inter> A i)"
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1176
  \<comment> \<open>Halmos, Naive Set Theory, page 35.\<close>
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1177
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1178
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1179
lemma Int_UN_distrib2: "(\<Union>i\<in>I. A i) \<inter> (\<Union>j\<in>J. B j) = (\<Union>i\<in>I. \<Union>j\<in>J. A i \<inter> B j)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1180
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1181
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1182
lemma Un_INT_distrib2: "(\<Inter>i\<in>I. A i) \<union> (\<Inter>j\<in>J. B j) = (\<Inter>i\<in>I. \<Inter>j\<in>J. A i \<union> B j)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1183
  by blast
44039
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1184
c3d0dac940fc generalized lemmas to complete lattices
haftmann
parents: 44032
diff changeset
  1185
lemma Union_disjoint: "(\<Union>C \<inter> A = {}) \<longleftrightarrow> (\<forall>B\<in>C. B \<inter> A = {})"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1186
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1187
67613
ce654b0e6d69 more symbols;
wenzelm
parents: 67399
diff changeset
  1188
lemma SUP_UNION: "(\<Squnion>x\<in>(\<Union>y\<in>A. g y). f x) = (\<Squnion>y\<in>A. \<Squnion>x\<in>g y. f x :: _ :: complete_lattice)"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1189
  by (rule order_antisym) (blast intro: SUP_least SUP_upper2)+
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1190
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1191
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1192
subsection \<open>Injections and bijections\<close>
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1193
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1194
lemma inj_on_Inter: "S \<noteq> {} \<Longrightarrow> (\<And>A. A \<in> S \<Longrightarrow> inj_on f A) \<Longrightarrow> inj_on f (\<Inter>S)"
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1195
  unfolding inj_on_def by blast
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1196
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1197
lemma inj_on_INTER: "I \<noteq> {} \<Longrightarrow> (\<And>i. i \<in> I \<Longrightarrow> inj_on f (A i)) \<Longrightarrow> inj_on f (\<Inter>i \<in> I. A i)"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
  1198
  unfolding inj_on_def by safe simp
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1199
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1200
lemma inj_on_UNION_chain:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1201
  assumes chain: "\<And>i j. i \<in> I \<Longrightarrow> j \<in> I \<Longrightarrow> A i \<le> A j \<or> A j \<le> A i"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1202
    and inj: "\<And>i. i \<in> I \<Longrightarrow> inj_on f (A i)"
60585
48fdff264eb2 tuned whitespace;
wenzelm
parents: 60307
diff changeset
  1203
  shows "inj_on f (\<Union>i \<in> I. A i)"
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1204
proof -
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1205
  have "x = y"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1206
    if *: "i \<in> I" "j \<in> I"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1207
    and **: "x \<in> A i" "y \<in> A j"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1208
    and ***: "f x = f y"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1209
    for i j x y
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1210
    using chain [OF *]
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1211
  proof
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1212
    assume "A i \<le> A j"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1213
    with ** have "x \<in> A j" by auto
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1214
    with inj * ** *** show ?thesis
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1215
      by (auto simp add: inj_on_def)
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1216
  next
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1217
    assume "A j \<le> A i"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1218
    with ** have "y \<in> A i" by auto
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1219
    with inj * ** *** show ?thesis
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1220
      by (auto simp add: inj_on_def)
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1221
  qed
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1222
  then show ?thesis
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1223
    by (unfold inj_on_def UNION_eq) auto
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1224
qed
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1225
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1226
lemma bij_betw_UNION_chain:
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1227
  assumes chain: "\<And>i j. i \<in> I \<Longrightarrow> j \<in> I \<Longrightarrow> A i \<le> A j \<or> A j \<le> A i"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1228
    and bij: "\<And>i. i \<in> I \<Longrightarrow> bij_betw f (A i) (A' i)"
60585
48fdff264eb2 tuned whitespace;
wenzelm
parents: 60307
diff changeset
  1229
  shows "bij_betw f (\<Union>i \<in> I. A i) (\<Union>i \<in> I. A' i)"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1230
  unfolding bij_betw_def
63576
ba972a7dbeba tuned proof;
wenzelm
parents: 63575
diff changeset
  1231
proof safe
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1232
  have "\<And>i. i \<in> I \<Longrightarrow> inj_on f (A i)"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1233
    using bij bij_betw_def[of f] by auto
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1234
  then show "inj_on f (\<Union>(A ` I))"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1235
    using chain inj_on_UNION_chain[of I A f] by auto
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1236
next
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1237
  fix i x
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1238
  assume *: "i \<in> I" "x \<in> A i"
63576
ba972a7dbeba tuned proof;
wenzelm
parents: 63575
diff changeset
  1239
  with bij have "f x \<in> A' i"
ba972a7dbeba tuned proof;
wenzelm
parents: 63575
diff changeset
  1240
    by (auto simp: bij_betw_def)
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1241
  with * show "f x \<in> \<Union>(A' ` I)" by blast
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1242
next
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1243
  fix i x'
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1244
  assume *: "i \<in> I" "x' \<in> A' i"
63576
ba972a7dbeba tuned proof;
wenzelm
parents: 63575
diff changeset
  1245
  with bij have "\<exists>x \<in> A i. x' = f x"
ba972a7dbeba tuned proof;
wenzelm
parents: 63575
diff changeset
  1246
    unfolding bij_betw_def by blast
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1247
  with * have "\<exists>j \<in> I. \<exists>x \<in> A j. x' = f x"
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1248
    by blast
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1249
  then show "x' \<in> f ` \<Union>(A ` I)"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1250
    by blast
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1251
qed
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1252
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1253
(*injectivity's required.  Left-to-right inclusion holds even if A is empty*)
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1254
lemma image_INT: "inj_on f C \<Longrightarrow> \<forall>x\<in>A. B x \<subseteq> C \<Longrightarrow> j \<in> A \<Longrightarrow> f ` (\<Inter>(B ` A)) = (\<Inter>x\<in>A. f ` B x)"
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1255
  by (auto simp add: inj_on_def) blast
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1256
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1257
lemma bij_image_INT: "bij f \<Longrightarrow> f ` (\<Inter>(B ` A)) = (\<Inter>x\<in>A. f ` B x)"
64966
d53d7ca3303e added inj_def (redundant, analogous to surj_def, bij_def);
wenzelm
parents: 63879
diff changeset
  1258
  by (auto simp: bij_def inj_def surj_def) blast
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1259
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1260
lemma UNION_fun_upd: "\<Union>(A(i := B) ` J) = \<Union>(A ` (J - {i})) \<union> (if i \<in> J then B else {})"
62343
24106dc44def prefer abbreviations for compound operators INFIMUM and SUPREMUM
haftmann
parents: 62048
diff changeset
  1261
  by (auto simp add: set_eq_iff)
63365
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1262
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1263
lemma bij_betw_Pow:
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1264
  assumes "bij_betw f A B"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1265
  shows "bij_betw (image f) (Pow A) (Pow B)"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1266
proof -
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1267
  from assms have "inj_on f A"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1268
    by (rule bij_betw_imp_inj_on)
69745
aec42cee2521 more canonical and less specialized syntax
nipkow
parents: 69593
diff changeset
  1269
  then have "inj_on f (\<Union>(Pow A))"
63365
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1270
    by simp
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1271
  then have "inj_on (image f) (Pow A)"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1272
    by (rule inj_on_image)
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1273
  then have "bij_betw (image f) (Pow A) (image f ` Pow A)"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1274
    by (rule inj_on_imp_bij_betw)
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1275
  moreover from assms have "f ` A = B"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1276
    by (rule bij_betw_imp_surj_on)
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1277
  then have "image f ` Pow A = Pow B"
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1278
    by (rule image_Pow_surj)
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1279
  ultimately show ?thesis by simp
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1280
qed
5340fb6633d0 more theorems
haftmann
parents: 63172
diff changeset
  1281
56015
57e2cfba9c6e bootstrap fundamental Fun theory immediately after Set theory, without dependency on complete lattices
haftmann
parents: 54414
diff changeset
  1282
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1283
subsubsection \<open>Complement\<close>
32135
f645b51e8e54 set intersection and union now named inter and union; closer connection between set and lattice operations; factored out complete lattice
haftmann
parents: 32120
diff changeset
  1284
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
  1285
lemma Compl_INT [simp]: "- (\<Inter>x\<in>A. B x) = (\<Union>x\<in>A. -B x)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1286
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1287
43873
8a2f339641c1 more on complement
haftmann
parents: 43872
diff changeset
  1288
lemma Compl_UN [simp]: "- (\<Union>x\<in>A. B x) = (\<Inter>x\<in>A. -B x)"
67829
2a6ef5ba4822 Changes to complete distributive lattices due to Viorel Preoteasa
Manuel Eberl <eberlm@in.tum.de>
parents: 67673
diff changeset
  1289
  by blast
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1290
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1291
subsubsection \<open>Miniscoping and maxiscoping\<close>
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1292
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1293
text \<open>\<^medskip> Miniscoping: pushing in quantifiers and big Unions and Intersections.\<close>
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1294
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1295
lemma UN_simps [simp]:
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1296
  "\<And>a B C. (\<Union>x\<in>C. insert a (B x)) = (if C={} then {} else insert a (\<Union>x\<in>C. B x))"
44032
cb768f4ceaf9 solving duality problem for complete_distrib_lattice; tuned
haftmann
parents: 44029
diff changeset
  1297
  "\<And>A B C. (\<Union>x\<in>C. A x \<union> B) = ((if C={} then {} else (\<Union>x\<in>C. A x) \<union> B))"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1298
  "\<And>A B C. (\<Union>x\<in>C. A \<union> B x) = ((if C={} then {} else A \<union> (\<Union>x\<in>C. B x)))"
44032
cb768f4ceaf9 solving duality problem for complete_distrib_lattice; tuned
haftmann
parents: 44029
diff changeset
  1299
  "\<And>A B C. (\<Union>x\<in>C. A x \<inter> B) = ((\<Union>x\<in>C. A x) \<inter> B)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1300
  "\<And>A B C. (\<Union>x\<in>C. A \<inter> B x) = (A \<inter>(\<Union>x\<in>C. B x))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1301
  "\<And>A B C. (\<Union>x\<in>C. A x - B) = ((\<Union>x\<in>C. A x) - B)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1302
  "\<And>A B C. (\<Union>x\<in>C. A - B x) = (A - (\<Inter>x\<in>C. B x))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1303
  "\<And>A B. (\<Union>x\<in>\<Union>A. B x) = (\<Union>y\<in>A. \<Union>x\<in>y. B x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1304
  "\<And>A B C. (\<Union>z\<in>(\<Union>(B ` A)). C z) = (\<Union>x\<in>A. \<Union>z\<in>B x. C z)"
43831
e323be6b02a5 tuned notation and proofs
haftmann
parents: 43818
diff changeset
  1305
  "\<And>A B f. (\<Union>x\<in>f`A. B x) = (\<Union>a\<in>A. B (f a))"
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1306
  by auto
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1307
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1308
lemma INT_simps [simp]:
44032
cb768f4ceaf9 solving duality problem for complete_distrib_lattice; tuned
haftmann
parents: 44029
diff changeset
  1309
  "\<And>A B C. (\<Inter>x\<in>C. A x \<inter> B) = (if C={} then UNIV else (\<Inter>x\<in>C. A x) \<inter> B)"
43831
e323be6b02a5 tuned notation and proofs
haftmann
parents: 43818
diff changeset
  1310
  "\<And>A B C. (\<Inter>x\<in>C. A \<inter> B x) = (if C={} then UNIV else A \<inter>(\<Inter>x\<in>C. B x))"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1311
  "\<And>A B C. (\<Inter>x\<in>C. A x - B) = (if C={} then UNIV else (\<Inter>x\<in>C. A x) - B)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1312
  "\<And>A B C. (\<Inter>x\<in>C. A - B x) = (if C={} then UNIV else A - (\<Union>x\<in>C. B x))"
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1313
  "\<And>a B C. (\<Inter>x\<in>C. insert a (B x)) = insert a (\<Inter>x\<in>C. B x)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1314
  "\<And>A B C. (\<Inter>x\<in>C. A x \<union> B) = ((\<Inter>x\<in>C. A x) \<union> B)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1315
  "\<And>A B C. (\<Inter>x\<in>C. A \<union> B x) = (A \<union> (\<Inter>x\<in>C. B x))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1316
  "\<And>A B. (\<Inter>x\<in>\<Union>A. B x) = (\<Inter>y\<in>A. \<Inter>x\<in>y. B x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1317
  "\<And>A B C. (\<Inter>z\<in>(\<Union>(B ` A)). C z) = (\<Inter>x\<in>A. \<Inter>z\<in>B x. C z)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1318
  "\<And>A B f. (\<Inter>x\<in>f`A. B x) = (\<Inter>a\<in>A. B (f a))"
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1319
  by auto
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1320
54147
97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete
blanchet
parents: 53374
diff changeset
  1321
lemma UN_ball_bex_simps [simp]:
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1322
  "\<And>A P. (\<forall>x\<in>\<Union>A. P x) \<longleftrightarrow> (\<forall>y\<in>A. \<forall>x\<in>y. P x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1323
  "\<And>A B P. (\<forall>x\<in>(\<Union>(B ` A)). P x) = (\<forall>a\<in>A. \<forall>x\<in> B a. P x)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1324
  "\<And>A P. (\<exists>x\<in>\<Union>A. P x) \<longleftrightarrow> (\<exists>y\<in>A. \<exists>x\<in>y. P x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1325
  "\<And>A B P. (\<exists>x\<in>(\<Union>(B ` A)). P x) \<longleftrightarrow> (\<exists>a\<in>A. \<exists>x\<in>B a. P x)"
12897
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1326
  by auto
f4d10ad0ea7b converted/deleted equalities.ML, mono.ML, subset.ML (see Set.thy);
wenzelm
parents: 12633
diff changeset
  1327
43943
e6928fc2332a moved some lemmas
haftmann
parents: 43940
diff changeset
  1328
63575
b9bd9e61fd63 misc tuning and modernization;
wenzelm
parents: 63469
diff changeset
  1329
text \<open>\<^medskip> Maxiscoping: pulling out big Unions and Intersections.\<close>
13860
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1330
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1331
lemma UN_extend_simps:
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1332
  "\<And>a B C. insert a (\<Union>x\<in>C. B x) = (if C={} then {a} else (\<Union>x\<in>C. insert a (B x)))"
44032
cb768f4ceaf9 solving duality problem for complete_distrib_lattice; tuned
haftmann
parents: 44029
diff changeset
  1333
  "\<And>A B C. (\<Union>x\<in>C. A x) \<union> B = (if C={} then B else (\<Union>x\<in>C. A x \<union> B))"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1334
  "\<And>A B C. A \<union> (\<Union>x\<in>C. B x) = (if C={} then A else (\<Union>x\<in>C. A \<union> B x))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1335
  "\<And>A B C. ((\<Union>x\<in>C. A x) \<inter> B) = (\<Union>x\<in>C. A x \<inter> B)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1336
  "\<And>A B C. (A \<inter> (\<Union>x\<in>C. B x)) = (\<Union>x\<in>C. A \<inter> B x)"
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1337
  "\<And>A B C. ((\<Union>x\<in>C. A x) - B) = (\<Union>x\<in>C. A x - B)"
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1338
  "\<And>A B C. (A - (\<Inter>x\<in>C. B x)) = (\<Union>x\<in>C. A - B x)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1339
  "\<And>A B. (\<Union>y\<in>A. \<Union>x\<in>y. B x) = (\<Union>x\<in>\<Union>A. B x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1340
  "\<And>A B C. (\<Union>x\<in>A. \<Union>z\<in>B x. C z) = (\<Union>z\<in>(\<Union>(B ` A)). C z)"
43831
e323be6b02a5 tuned notation and proofs
haftmann
parents: 43818
diff changeset
  1341
  "\<And>A B f. (\<Union>a\<in>A. B (f a)) = (\<Union>x\<in>f`A. B x)"
13860
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1342
  by auto
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1343
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1344
lemma INT_extend_simps:
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1345
  "\<And>A B C. (\<Inter>x\<in>C. A x) \<inter> B = (if C={} then B else (\<Inter>x\<in>C. A x \<inter> B))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1346
  "\<And>A B C. A \<inter> (\<Inter>x\<in>C. B x) = (if C={} then A else (\<Inter>x\<in>C. A \<inter> B x))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1347
  "\<And>A B C. (\<Inter>x\<in>C. A x) - B = (if C={} then UNIV - B else (\<Inter>x\<in>C. A x - B))"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1348
  "\<And>A B C. A - (\<Union>x\<in>C. B x) = (if C={} then A else (\<Inter>x\<in>C. A - B x))"
43817
d53350bc65a4 tuned notation
haftmann
parents: 43814
diff changeset
  1349
  "\<And>a B C. insert a (\<Inter>x\<in>C. B x) = (\<Inter>x\<in>C. insert a (B x))"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1350
  "\<And>A B C. ((\<Inter>x\<in>C. A x) \<union> B) = (\<Inter>x\<in>C. A x \<union> B)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1351
  "\<And>A B C. A \<union> (\<Inter>x\<in>C. B x) = (\<Inter>x\<in>C. A \<union> B x)"
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1352
  "\<And>A B. (\<Inter>y\<in>A. \<Inter>x\<in>y. B x) = (\<Inter>x\<in>\<Union>A. B x)"
69275
9bbd5497befd clarified status of legacy input abbreviations
haftmann
parents: 69274
diff changeset
  1353
  "\<And>A B C. (\<Inter>x\<in>A. \<Inter>z\<in>B x. C z) = (\<Inter>z\<in>(\<Union>(B ` A)). C z)"
43852
7411fbf0a325 tuned notation
haftmann
parents: 43831
diff changeset
  1354
  "\<And>A B f. (\<Inter>a\<in>A. B (f a)) = (\<Inter>x\<in>f`A. B x)"
13860
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1355
  by auto
b681a3cb0beb new UN/INT simprules
paulson
parents: 13858
diff changeset
  1356
60758
d8d85a8172b5 isabelle update_cartouches;
wenzelm
parents: 60585
diff changeset
  1357
text \<open>Finally\<close>
43872
6b917e5877d2 more consistent theorem names
haftmann
parents: 43871
diff changeset
  1358
30596
140b22f22071 tuned some theorem and attribute bindings
haftmann
parents: 30531
diff changeset
  1359
lemmas mem_simps =
140b22f22071 tuned some theorem and attribute bindings
haftmann
parents: 30531
diff changeset
  1360
  insert_iff empty_iff Un_iff Int_iff Compl_iff Diff_iff
140b22f22071 tuned some theorem and attribute bindings
haftmann
parents: 30531
diff changeset
  1361
  mem_Collect_eq UN_iff Union_iff INT_iff Inter_iff
61799
4cf66f21b764 isabelle update_cartouches -c -t;
wenzelm
parents: 61630
diff changeset
  1362
  \<comment> \<open>Each of these has ALREADY been added \<open>[simp]\<close> above.\<close>
21669
c68717c16013 removed legacy ML bindings;
wenzelm
parents: 21549
diff changeset
  1363
11979
0a3dace545c5 converted theory "Set";
wenzelm
parents: 11752
diff changeset
  1364
end