src/HOL/Orderings.thy
author haftmann
Fri Jun 20 21:00:21 2008 +0200 (2008-06-20)
changeset 27299 3447cd2e18e8
parent 27107 4a7415c67063
child 27682 25aceefd4786
permissions -rw-r--r--
streamlined definitions
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(*  Title:      HOL/Orderings.thy
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    ID:         $Id$
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    Author:     Tobias Nipkow, Markus Wenzel, and Larry Paulson
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*)
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header {* Abstract orderings *}
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theory Orderings
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imports Code_Setup
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uses
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  "~~/src/Provers/order.ML"
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begin
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subsection {* Partial orders *}
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class order = ord +
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  assumes less_le: "x < y \<longleftrightarrow> x \<le> y \<and> x \<noteq> y"
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  and order_refl [iff]: "x \<le> x"
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  and order_trans: "x \<le> y \<Longrightarrow> y \<le> z \<Longrightarrow> x \<le> z"
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  assumes antisym: "x \<le> y \<Longrightarrow> y \<le> x \<Longrightarrow> x = y"
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begin
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text {* Reflexivity. *}
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lemma eq_refl: "x = y \<Longrightarrow> x \<le> y"
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    -- {* This form is useful with the classical reasoner. *}
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by (erule ssubst) (rule order_refl)
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lemma less_irrefl [iff]: "\<not> x < x"
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by (simp add: less_le)
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lemma le_less: "x \<le> y \<longleftrightarrow> x < y \<or> x = y"
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    -- {* NOT suitable for iff, since it can cause PROOF FAILED. *}
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by (simp add: less_le) blast
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lemma le_imp_less_or_eq: "x \<le> y \<Longrightarrow> x < y \<or> x = y"
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unfolding less_le by blast
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lemma less_imp_le: "x < y \<Longrightarrow> x \<le> y"
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unfolding less_le by blast
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text {* Useful for simplification, but too risky to include by default. *}
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lemma less_imp_not_eq: "x < y \<Longrightarrow> (x = y) \<longleftrightarrow> False"
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by auto
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lemma less_imp_not_eq2: "x < y \<Longrightarrow> (y = x) \<longleftrightarrow> False"
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by auto
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text {* Transitivity rules for calculational reasoning *}
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lemma neq_le_trans: "a \<noteq> b \<Longrightarrow> a \<le> b \<Longrightarrow> a < b"
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by (simp add: less_le)
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lemma le_neq_trans: "a \<le> b \<Longrightarrow> a \<noteq> b \<Longrightarrow> a < b"
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by (simp add: less_le)
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text {* Asymmetry. *}
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lemma less_not_sym: "x < y \<Longrightarrow> \<not> (y < x)"
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by (simp add: less_le antisym)
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lemma less_asym: "x < y \<Longrightarrow> (\<not> P \<Longrightarrow> y < x) \<Longrightarrow> P"
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by (drule less_not_sym, erule contrapos_np) simp
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lemma eq_iff: "x = y \<longleftrightarrow> x \<le> y \<and> y \<le> x"
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by (blast intro: antisym)
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lemma antisym_conv: "y \<le> x \<Longrightarrow> x \<le> y \<longleftrightarrow> x = y"
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by (blast intro: antisym)
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lemma less_imp_neq: "x < y \<Longrightarrow> x \<noteq> y"
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by (erule contrapos_pn, erule subst, rule less_irrefl)
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text {* Transitivity. *}
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lemma less_trans: "x < y \<Longrightarrow> y < z \<Longrightarrow> x < z"
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by (simp add: less_le) (blast intro: order_trans antisym)
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lemma le_less_trans: "x \<le> y \<Longrightarrow> y < z \<Longrightarrow> x < z"
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by (simp add: less_le) (blast intro: order_trans antisym)
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lemma less_le_trans: "x < y \<Longrightarrow> y \<le> z \<Longrightarrow> x < z"
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by (simp add: less_le) (blast intro: order_trans antisym)
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text {* Useful for simplification, but too risky to include by default. *}
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lemma less_imp_not_less: "x < y \<Longrightarrow> (\<not> y < x) \<longleftrightarrow> True"
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by (blast elim: less_asym)
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lemma less_imp_triv: "x < y \<Longrightarrow> (y < x \<longrightarrow> P) \<longleftrightarrow> True"
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by (blast elim: less_asym)
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text {* Transitivity rules for calculational reasoning *}
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lemma less_asym': "a < b \<Longrightarrow> b < a \<Longrightarrow> P"
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by (rule less_asym)
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text {* Least value operator *}
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definition (in ord)
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  Least :: "('a \<Rightarrow> bool) \<Rightarrow> 'a" (binder "LEAST " 10) where
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  "Least P = (THE x. P x \<and> (\<forall>y. P y \<longrightarrow> x \<le> y))"
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lemma Least_equality:
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  assumes "P x"
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    and "\<And>y. P y \<Longrightarrow> x \<le> y"
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  shows "Least P = x"
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unfolding Least_def by (rule the_equality)
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  (blast intro: assms antisym)+
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lemma LeastI2_order:
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  assumes "P x"
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    and "\<And>y. P y \<Longrightarrow> x \<le> y"
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    and "\<And>x. P x \<Longrightarrow> \<forall>y. P y \<longrightarrow> x \<le> y \<Longrightarrow> Q x"
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  shows "Q (Least P)"
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unfolding Least_def by (rule theI2)
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  (blast intro: assms antisym)+
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text {* Dual order *}
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lemma dual_order:
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  "order (op \<ge>) (op >)"
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by unfold_locales
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   (simp add: less_le, auto intro: antisym order_trans)
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end
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subsection {* Linear (total) orders *}
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class linorder = order +
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  assumes linear: "x \<le> y \<or> y \<le> x"
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begin
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lemma less_linear: "x < y \<or> x = y \<or> y < x"
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unfolding less_le using less_le linear by blast
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lemma le_less_linear: "x \<le> y \<or> y < x"
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by (simp add: le_less less_linear)
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lemma le_cases [case_names le ge]:
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  "(x \<le> y \<Longrightarrow> P) \<Longrightarrow> (y \<le> x \<Longrightarrow> P) \<Longrightarrow> P"
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using linear by blast
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lemma linorder_cases [case_names less equal greater]:
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  "(x < y \<Longrightarrow> P) \<Longrightarrow> (x = y \<Longrightarrow> P) \<Longrightarrow> (y < x \<Longrightarrow> P) \<Longrightarrow> P"
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using less_linear by blast
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lemma not_less: "\<not> x < y \<longleftrightarrow> y \<le> x"
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apply (simp add: less_le)
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using linear apply (blast intro: antisym)
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done
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lemma not_less_iff_gr_or_eq:
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 "\<not>(x < y) \<longleftrightarrow> (x > y | x = y)"
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apply(simp add:not_less le_less)
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apply blast
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done
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lemma not_le: "\<not> x \<le> y \<longleftrightarrow> y < x"
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apply (simp add: less_le)
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using linear apply (blast intro: antisym)
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done
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lemma neq_iff: "x \<noteq> y \<longleftrightarrow> x < y \<or> y < x"
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by (cut_tac x = x and y = y in less_linear, auto)
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lemma neqE: "x \<noteq> y \<Longrightarrow> (x < y \<Longrightarrow> R) \<Longrightarrow> (y < x \<Longrightarrow> R) \<Longrightarrow> R"
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by (simp add: neq_iff) blast
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lemma antisym_conv1: "\<not> x < y \<Longrightarrow> x \<le> y \<longleftrightarrow> x = y"
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by (blast intro: antisym dest: not_less [THEN iffD1])
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lemma antisym_conv2: "x \<le> y \<Longrightarrow> \<not> x < y \<longleftrightarrow> x = y"
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by (blast intro: antisym dest: not_less [THEN iffD1])
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lemma antisym_conv3: "\<not> y < x \<Longrightarrow> \<not> x < y \<longleftrightarrow> x = y"
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by (blast intro: antisym dest: not_less [THEN iffD1])
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lemma leI: "\<not> x < y \<Longrightarrow> y \<le> x"
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unfolding not_less .
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lemma leD: "y \<le> x \<Longrightarrow> \<not> x < y"
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unfolding not_less .
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(*FIXME inappropriate name (or delete altogether)*)
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lemma not_leE: "\<not> y \<le> x \<Longrightarrow> x < y"
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unfolding not_le .
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text {* Dual order *}
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lemma dual_linorder:
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  "linorder (op \<ge>) (op >)"
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by unfold_locales
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  (simp add: less_le, auto intro: antisym order_trans simp add: linear)
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text {* min/max *}
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definition (in ord) min :: "'a \<Rightarrow> 'a \<Rightarrow> 'a" where
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  [code unfold, code inline del]: "min a b = (if a \<le> b then a else b)"
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definition (in ord) max :: "'a \<Rightarrow> 'a \<Rightarrow> 'a" where
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  [code unfold, code inline del]: "max a b = (if a \<le> b then b else a)"
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lemma min_le_iff_disj:
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  "min x y \<le> z \<longleftrightarrow> x \<le> z \<or> y \<le> z"
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unfolding min_def using linear by (auto intro: order_trans)
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lemma le_max_iff_disj:
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  "z \<le> max x y \<longleftrightarrow> z \<le> x \<or> z \<le> y"
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unfolding max_def using linear by (auto intro: order_trans)
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lemma min_less_iff_disj:
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  "min x y < z \<longleftrightarrow> x < z \<or> y < z"
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unfolding min_def le_less using less_linear by (auto intro: less_trans)
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lemma less_max_iff_disj:
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  "z < max x y \<longleftrightarrow> z < x \<or> z < y"
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unfolding max_def le_less using less_linear by (auto intro: less_trans)
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lemma min_less_iff_conj [simp]:
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  "z < min x y \<longleftrightarrow> z < x \<and> z < y"
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unfolding min_def le_less using less_linear by (auto intro: less_trans)
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lemma max_less_iff_conj [simp]:
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  "max x y < z \<longleftrightarrow> x < z \<and> y < z"
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unfolding max_def le_less using less_linear by (auto intro: less_trans)
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lemma split_min [noatp]:
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  "P (min i j) \<longleftrightarrow> (i \<le> j \<longrightarrow> P i) \<and> (\<not> i \<le> j \<longrightarrow> P j)"
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by (simp add: min_def)
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lemma split_max [noatp]:
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  "P (max i j) \<longleftrightarrow> (i \<le> j \<longrightarrow> P j) \<and> (\<not> i \<le> j \<longrightarrow> P i)"
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by (simp add: max_def)
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end
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subsection {* Reasoning tools setup *}
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ML {*
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signature ORDERS =
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sig
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  val print_structures: Proof.context -> unit
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  val setup: theory -> theory
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  val order_tac: thm list -> Proof.context -> int -> tactic
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end;
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structure Orders: ORDERS =
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struct
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(** Theory and context data **)
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fun struct_eq ((s1: string, ts1), (s2, ts2)) =
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  (s1 = s2) andalso eq_list (op aconv) (ts1, ts2);
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structure Data = GenericDataFun
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(
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  type T = ((string * term list) * Order_Tac.less_arith) list;
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    (* Order structures:
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       identifier of the structure, list of operations and record of theorems
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       needed to set up the transitivity reasoner,
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       identifier and operations identify the structure uniquely. *)
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  val empty = [];
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  val extend = I;
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  fun merge _ = AList.join struct_eq (K fst);
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);
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fun print_structures ctxt =
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  let
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    val structs = Data.get (Context.Proof ctxt);
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    fun pretty_term t = Pretty.block
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      [Pretty.quote (Syntax.pretty_term ctxt t), Pretty.brk 1,
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        Pretty.str "::", Pretty.brk 1,
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        Pretty.quote (Syntax.pretty_typ ctxt (type_of t))];
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    fun pretty_struct ((s, ts), _) = Pretty.block
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      [Pretty.str s, Pretty.str ":", Pretty.brk 1,
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       Pretty.enclose "(" ")" (Pretty.breaks (map pretty_term ts))];
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  in
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    Pretty.writeln (Pretty.big_list "Order structures:" (map pretty_struct structs))
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  end;
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(** Method **)
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fun struct_tac ((s, [eq, le, less]), thms) prems =
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  let
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    fun decomp thy (Trueprop $ t) =
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      let
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        fun excluded t =
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          (* exclude numeric types: linear arithmetic subsumes transitivity *)
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          let val T = type_of t
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          in
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	    T = HOLogic.natT orelse T = HOLogic.intT orelse T = HOLogic.realT
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          end;
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	fun rel (bin_op $ t1 $ t2) =
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              if excluded t1 then NONE
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              else if Pattern.matches thy (eq, bin_op) then SOME (t1, "=", t2)
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              else if Pattern.matches thy (le, bin_op) then SOME (t1, "<=", t2)
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              else if Pattern.matches thy (less, bin_op) then SOME (t1, "<", t2)
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              else NONE
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	  | rel _ = NONE;
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	fun dec (Const (@{const_name Not}, _) $ t) = (case rel t
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	      of NONE => NONE
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	       | SOME (t1, rel, t2) => SOME (t1, "~" ^ rel, t2))
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          | dec x = rel x;
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      in dec t end;
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  in
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    case s of
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      "order" => Order_Tac.partial_tac decomp thms prems
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    | "linorder" => Order_Tac.linear_tac decomp thms prems
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    | _ => error ("Unknown kind of order `" ^ s ^ "' encountered in transitivity reasoner.")
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  end
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fun order_tac prems ctxt =
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  FIRST' (map (fn s => CHANGED o struct_tac s prems) (Data.get (Context.Proof ctxt)));
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(** Attribute **)
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fun add_struct_thm s tag =
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  Thm.declaration_attribute
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    (fn thm => Data.map (AList.map_default struct_eq (s, Order_Tac.empty TrueI) (Order_Tac.update tag thm)));
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fun del_struct s =
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  Thm.declaration_attribute
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    (fn _ => Data.map (AList.delete struct_eq s));
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val attribute = Attrib.syntax
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     (Scan.lift ((Args.add -- Args.name >> (fn (_, s) => SOME s) ||
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          Args.del >> K NONE) --| Args.colon (* FIXME ||
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        Scan.succeed true *) ) -- Scan.lift Args.name --
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      Scan.repeat Args.term
ballarin@24641
   346
      >> (fn ((SOME tag, n), ts) => add_struct_thm (n, ts) tag
ballarin@24641
   347
           | ((NONE, n), ts) => del_struct (n, ts)));
ballarin@24641
   348
ballarin@24641
   349
ballarin@24641
   350
(** Diagnostic command **)
ballarin@24641
   351
ballarin@24641
   352
val print = Toplevel.unknown_context o
ballarin@24641
   353
  Toplevel.keep (Toplevel.node_case
ballarin@24641
   354
    (Context.cases (print_structures o ProofContext.init) print_structures)
ballarin@24641
   355
    (print_structures o Proof.context_of));
ballarin@24641
   356
wenzelm@24867
   357
val _ =
ballarin@24641
   358
  OuterSyntax.improper_command "print_orders"
ballarin@24641
   359
    "print order structures available to transitivity reasoner" OuterKeyword.diag
ballarin@24641
   360
    (Scan.succeed (Toplevel.no_timing o print));
ballarin@24641
   361
ballarin@24641
   362
ballarin@24641
   363
(** Setup **)
ballarin@24641
   364
wenzelm@24867
   365
val setup =
wenzelm@24867
   366
  Method.add_methods
wenzelm@24867
   367
    [("order", Method.ctxt_args (Method.SIMPLE_METHOD' o order_tac []), "transitivity reasoner")] #>
wenzelm@24867
   368
  Attrib.add_attributes [("order", attribute, "theorems controlling transitivity reasoner")];
haftmann@21091
   369
haftmann@21091
   370
end;
ballarin@24641
   371
haftmann@21091
   372
*}
haftmann@21091
   373
ballarin@24641
   374
setup Orders.setup
ballarin@24641
   375
ballarin@24641
   376
ballarin@24641
   377
text {* Declarations to set up transitivity reasoner of partial and linear orders. *}
ballarin@24641
   378
haftmann@25076
   379
context order
haftmann@25076
   380
begin
haftmann@25076
   381
ballarin@24641
   382
(* The type constraint on @{term op =} below is necessary since the operation
ballarin@24641
   383
   is not a parameter of the locale. *)
haftmann@25076
   384
haftmann@25076
   385
lemmas
haftmann@25076
   386
  [order add less_reflE: order "op = :: 'a \<Rightarrow> 'a \<Rightarrow> bool" "op <=" "op <"] =
ballarin@24641
   387
  less_irrefl [THEN notE]
haftmann@25076
   388
lemmas
haftmann@25062
   389
  [order add le_refl: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   390
  order_refl
haftmann@25076
   391
lemmas
haftmann@25062
   392
  [order add less_imp_le: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   393
  less_imp_le
haftmann@25076
   394
lemmas
haftmann@25062
   395
  [order add eqI: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   396
  antisym
haftmann@25076
   397
lemmas
haftmann@25062
   398
  [order add eqD1: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   399
  eq_refl
haftmann@25076
   400
lemmas
haftmann@25062
   401
  [order add eqD2: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   402
  sym [THEN eq_refl]
haftmann@25076
   403
lemmas
haftmann@25062
   404
  [order add less_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   405
  less_trans
haftmann@25076
   406
lemmas
haftmann@25062
   407
  [order add less_le_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   408
  less_le_trans
haftmann@25076
   409
lemmas
haftmann@25062
   410
  [order add le_less_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   411
  le_less_trans
haftmann@25076
   412
lemmas
haftmann@25062
   413
  [order add le_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   414
  order_trans
haftmann@25076
   415
lemmas
haftmann@25062
   416
  [order add le_neq_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   417
  le_neq_trans
haftmann@25076
   418
lemmas
haftmann@25062
   419
  [order add neq_le_trans: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   420
  neq_le_trans
haftmann@25076
   421
lemmas
haftmann@25062
   422
  [order add less_imp_neq: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   423
  less_imp_neq
haftmann@25076
   424
lemmas
haftmann@25062
   425
  [order add eq_neq_eq_imp_neq: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   426
   eq_neq_eq_imp_neq
haftmann@25076
   427
lemmas
haftmann@25062
   428
  [order add not_sym: order "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   429
  not_sym
ballarin@24641
   430
haftmann@25076
   431
end
haftmann@25076
   432
haftmann@25076
   433
context linorder
haftmann@25076
   434
begin
ballarin@24641
   435
haftmann@25076
   436
lemmas
haftmann@25076
   437
  [order del: order "op = :: 'a => 'a => bool" "op <=" "op <"] = _
haftmann@25076
   438
haftmann@25076
   439
lemmas
haftmann@25062
   440
  [order add less_reflE: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   441
  less_irrefl [THEN notE]
haftmann@25076
   442
lemmas
haftmann@25062
   443
  [order add le_refl: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   444
  order_refl
haftmann@25076
   445
lemmas
haftmann@25062
   446
  [order add less_imp_le: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   447
  less_imp_le
haftmann@25076
   448
lemmas
haftmann@25062
   449
  [order add not_lessI: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   450
  not_less [THEN iffD2]
haftmann@25076
   451
lemmas
haftmann@25062
   452
  [order add not_leI: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   453
  not_le [THEN iffD2]
haftmann@25076
   454
lemmas
haftmann@25062
   455
  [order add not_lessD: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   456
  not_less [THEN iffD1]
haftmann@25076
   457
lemmas
haftmann@25062
   458
  [order add not_leD: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   459
  not_le [THEN iffD1]
haftmann@25076
   460
lemmas
haftmann@25062
   461
  [order add eqI: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   462
  antisym
haftmann@25076
   463
lemmas
haftmann@25062
   464
  [order add eqD1: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   465
  eq_refl
haftmann@25076
   466
lemmas
haftmann@25062
   467
  [order add eqD2: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   468
  sym [THEN eq_refl]
haftmann@25076
   469
lemmas
haftmann@25062
   470
  [order add less_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   471
  less_trans
haftmann@25076
   472
lemmas
haftmann@25062
   473
  [order add less_le_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   474
  less_le_trans
haftmann@25076
   475
lemmas
haftmann@25062
   476
  [order add le_less_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   477
  le_less_trans
haftmann@25076
   478
lemmas
haftmann@25062
   479
  [order add le_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   480
  order_trans
haftmann@25076
   481
lemmas
haftmann@25062
   482
  [order add le_neq_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   483
  le_neq_trans
haftmann@25076
   484
lemmas
haftmann@25062
   485
  [order add neq_le_trans: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   486
  neq_le_trans
haftmann@25076
   487
lemmas
haftmann@25062
   488
  [order add less_imp_neq: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   489
  less_imp_neq
haftmann@25076
   490
lemmas
haftmann@25062
   491
  [order add eq_neq_eq_imp_neq: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   492
  eq_neq_eq_imp_neq
haftmann@25076
   493
lemmas
haftmann@25062
   494
  [order add not_sym: linorder "op = :: 'a => 'a => bool" "op <=" "op <"] =
ballarin@24641
   495
  not_sym
ballarin@24641
   496
haftmann@25076
   497
end
haftmann@25076
   498
ballarin@24641
   499
haftmann@21083
   500
setup {*
haftmann@21083
   501
let
haftmann@21083
   502
haftmann@21083
   503
fun prp t thm = (#prop (rep_thm thm) = t);
nipkow@15524
   504
haftmann@21083
   505
fun prove_antisym_le sg ss ((le as Const(_,T)) $ r $ s) =
haftmann@21083
   506
  let val prems = prems_of_ss ss;
haftmann@22916
   507
      val less = Const (@{const_name less}, T);
haftmann@21083
   508
      val t = HOLogic.mk_Trueprop(le $ s $ r);
haftmann@21083
   509
  in case find_first (prp t) prems of
haftmann@21083
   510
       NONE =>
haftmann@21083
   511
         let val t = HOLogic.mk_Trueprop(HOLogic.Not $ (less $ r $ s))
haftmann@21083
   512
         in case find_first (prp t) prems of
haftmann@21083
   513
              NONE => NONE
haftmann@24422
   514
            | SOME thm => SOME(mk_meta_eq(thm RS @{thm linorder_class.antisym_conv1}))
haftmann@21083
   515
         end
haftmann@24422
   516
     | SOME thm => SOME(mk_meta_eq(thm RS @{thm order_class.antisym_conv}))
haftmann@21083
   517
  end
haftmann@21083
   518
  handle THM _ => NONE;
nipkow@15524
   519
haftmann@21083
   520
fun prove_antisym_less sg ss (NotC $ ((less as Const(_,T)) $ r $ s)) =
haftmann@21083
   521
  let val prems = prems_of_ss ss;
haftmann@22916
   522
      val le = Const (@{const_name less_eq}, T);
haftmann@21083
   523
      val t = HOLogic.mk_Trueprop(le $ r $ s);
haftmann@21083
   524
  in case find_first (prp t) prems of
haftmann@21083
   525
       NONE =>
haftmann@21083
   526
         let val t = HOLogic.mk_Trueprop(NotC $ (less $ s $ r))
haftmann@21083
   527
         in case find_first (prp t) prems of
haftmann@21083
   528
              NONE => NONE
haftmann@24422
   529
            | SOME thm => SOME(mk_meta_eq(thm RS @{thm linorder_class.antisym_conv3}))
haftmann@21083
   530
         end
haftmann@24422
   531
     | SOME thm => SOME(mk_meta_eq(thm RS @{thm linorder_class.antisym_conv2}))
haftmann@21083
   532
  end
haftmann@21083
   533
  handle THM _ => NONE;
nipkow@15524
   534
haftmann@21248
   535
fun add_simprocs procs thy =
wenzelm@26496
   536
  Simplifier.map_simpset (fn ss => ss
haftmann@21248
   537
    addsimprocs (map (fn (name, raw_ts, proc) =>
wenzelm@26496
   538
      Simplifier.simproc thy name raw_ts proc) procs)) thy;
wenzelm@26496
   539
fun add_solver name tac =
wenzelm@26496
   540
  Simplifier.map_simpset (fn ss => ss addSolver
wenzelm@26496
   541
    mk_solver' name (fn ss => tac (Simplifier.prems_of_ss ss) (Simplifier.the_context ss)));
haftmann@21083
   542
haftmann@21083
   543
in
haftmann@21248
   544
  add_simprocs [
haftmann@21248
   545
       ("antisym le", ["(x::'a::order) <= y"], prove_antisym_le),
haftmann@21248
   546
       ("antisym less", ["~ (x::'a::linorder) < y"], prove_antisym_less)
haftmann@21248
   547
     ]
ballarin@24641
   548
  #> add_solver "Transitivity" Orders.order_tac
haftmann@21248
   549
  (* Adding the transitivity reasoners also as safe solvers showed a slight
haftmann@21248
   550
     speed up, but the reasoning strength appears to be not higher (at least
haftmann@21248
   551
     no breaking of additional proofs in the entire HOL distribution, as
haftmann@21248
   552
     of 5 March 2004, was observed). *)
haftmann@21083
   553
end
haftmann@21083
   554
*}
nipkow@15524
   555
nipkow@15524
   556
haftmann@24422
   557
subsection {* Name duplicates *}
haftmann@24422
   558
haftmann@24422
   559
lemmas order_less_le = less_le
haftmann@24422
   560
lemmas order_eq_refl = order_class.eq_refl
haftmann@24422
   561
lemmas order_less_irrefl = order_class.less_irrefl
haftmann@24422
   562
lemmas order_le_less = order_class.le_less
haftmann@24422
   563
lemmas order_le_imp_less_or_eq = order_class.le_imp_less_or_eq
haftmann@24422
   564
lemmas order_less_imp_le = order_class.less_imp_le
haftmann@24422
   565
lemmas order_less_imp_not_eq = order_class.less_imp_not_eq
haftmann@24422
   566
lemmas order_less_imp_not_eq2 = order_class.less_imp_not_eq2
haftmann@24422
   567
lemmas order_neq_le_trans = order_class.neq_le_trans
haftmann@24422
   568
lemmas order_le_neq_trans = order_class.le_neq_trans
haftmann@24422
   569
haftmann@24422
   570
lemmas order_antisym = antisym
haftmann@24422
   571
lemmas order_less_not_sym = order_class.less_not_sym
haftmann@24422
   572
lemmas order_less_asym = order_class.less_asym
haftmann@24422
   573
lemmas order_eq_iff = order_class.eq_iff
haftmann@24422
   574
lemmas order_antisym_conv = order_class.antisym_conv
haftmann@24422
   575
lemmas order_less_trans = order_class.less_trans
haftmann@24422
   576
lemmas order_le_less_trans = order_class.le_less_trans
haftmann@24422
   577
lemmas order_less_le_trans = order_class.less_le_trans
haftmann@24422
   578
lemmas order_less_imp_not_less = order_class.less_imp_not_less
haftmann@24422
   579
lemmas order_less_imp_triv = order_class.less_imp_triv
haftmann@24422
   580
lemmas order_less_asym' = order_class.less_asym'
haftmann@24422
   581
haftmann@24422
   582
lemmas linorder_linear = linear
haftmann@24422
   583
lemmas linorder_less_linear = linorder_class.less_linear
haftmann@24422
   584
lemmas linorder_le_less_linear = linorder_class.le_less_linear
haftmann@24422
   585
lemmas linorder_le_cases = linorder_class.le_cases
haftmann@24422
   586
lemmas linorder_not_less = linorder_class.not_less
haftmann@24422
   587
lemmas linorder_not_le = linorder_class.not_le
haftmann@24422
   588
lemmas linorder_neq_iff = linorder_class.neq_iff
haftmann@24422
   589
lemmas linorder_neqE = linorder_class.neqE
haftmann@24422
   590
lemmas linorder_antisym_conv1 = linorder_class.antisym_conv1
haftmann@24422
   591
lemmas linorder_antisym_conv2 = linorder_class.antisym_conv2
haftmann@24422
   592
lemmas linorder_antisym_conv3 = linorder_class.antisym_conv3
haftmann@24422
   593
haftmann@24422
   594
haftmann@21083
   595
subsection {* Bounded quantifiers *}
haftmann@21083
   596
haftmann@21083
   597
syntax
wenzelm@21180
   598
  "_All_less" :: "[idt, 'a, bool] => bool"    ("(3ALL _<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   599
  "_Ex_less" :: "[idt, 'a, bool] => bool"    ("(3EX _<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   600
  "_All_less_eq" :: "[idt, 'a, bool] => bool"    ("(3ALL _<=_./ _)" [0, 0, 10] 10)
wenzelm@21180
   601
  "_Ex_less_eq" :: "[idt, 'a, bool] => bool"    ("(3EX _<=_./ _)" [0, 0, 10] 10)
haftmann@21083
   602
wenzelm@21180
   603
  "_All_greater" :: "[idt, 'a, bool] => bool"    ("(3ALL _>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   604
  "_Ex_greater" :: "[idt, 'a, bool] => bool"    ("(3EX _>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   605
  "_All_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3ALL _>=_./ _)" [0, 0, 10] 10)
wenzelm@21180
   606
  "_Ex_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3EX _>=_./ _)" [0, 0, 10] 10)
haftmann@21083
   607
haftmann@21083
   608
syntax (xsymbols)
wenzelm@21180
   609
  "_All_less" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   610
  "_Ex_less" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   611
  "_All_less_eq" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_\<le>_./ _)" [0, 0, 10] 10)
wenzelm@21180
   612
  "_Ex_less_eq" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_\<le>_./ _)" [0, 0, 10] 10)
haftmann@21083
   613
wenzelm@21180
   614
  "_All_greater" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   615
  "_Ex_greater" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   616
  "_All_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_\<ge>_./ _)" [0, 0, 10] 10)
wenzelm@21180
   617
  "_Ex_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_\<ge>_./ _)" [0, 0, 10] 10)
haftmann@21083
   618
haftmann@21083
   619
syntax (HOL)
wenzelm@21180
   620
  "_All_less" :: "[idt, 'a, bool] => bool"    ("(3! _<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   621
  "_Ex_less" :: "[idt, 'a, bool] => bool"    ("(3? _<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   622
  "_All_less_eq" :: "[idt, 'a, bool] => bool"    ("(3! _<=_./ _)" [0, 0, 10] 10)
wenzelm@21180
   623
  "_Ex_less_eq" :: "[idt, 'a, bool] => bool"    ("(3? _<=_./ _)" [0, 0, 10] 10)
haftmann@21083
   624
haftmann@21083
   625
syntax (HTML output)
wenzelm@21180
   626
  "_All_less" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   627
  "_Ex_less" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_<_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   628
  "_All_less_eq" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_\<le>_./ _)" [0, 0, 10] 10)
wenzelm@21180
   629
  "_Ex_less_eq" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_\<le>_./ _)" [0, 0, 10] 10)
haftmann@21083
   630
wenzelm@21180
   631
  "_All_greater" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   632
  "_Ex_greater" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_>_./ _)"  [0, 0, 10] 10)
wenzelm@21180
   633
  "_All_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3\<forall>_\<ge>_./ _)" [0, 0, 10] 10)
wenzelm@21180
   634
  "_Ex_greater_eq" :: "[idt, 'a, bool] => bool"    ("(3\<exists>_\<ge>_./ _)" [0, 0, 10] 10)
haftmann@21083
   635
haftmann@21083
   636
translations
haftmann@21083
   637
  "ALL x<y. P"   =>  "ALL x. x < y \<longrightarrow> P"
haftmann@21083
   638
  "EX x<y. P"    =>  "EX x. x < y \<and> P"
haftmann@21083
   639
  "ALL x<=y. P"  =>  "ALL x. x <= y \<longrightarrow> P"
haftmann@21083
   640
  "EX x<=y. P"   =>  "EX x. x <= y \<and> P"
haftmann@21083
   641
  "ALL x>y. P"   =>  "ALL x. x > y \<longrightarrow> P"
haftmann@21083
   642
  "EX x>y. P"    =>  "EX x. x > y \<and> P"
haftmann@21083
   643
  "ALL x>=y. P"  =>  "ALL x. x >= y \<longrightarrow> P"
haftmann@21083
   644
  "EX x>=y. P"   =>  "EX x. x >= y \<and> P"
haftmann@21083
   645
haftmann@21083
   646
print_translation {*
haftmann@21083
   647
let
haftmann@22916
   648
  val All_binder = Syntax.binder_name @{const_syntax All};
haftmann@22916
   649
  val Ex_binder = Syntax.binder_name @{const_syntax Ex};
wenzelm@22377
   650
  val impl = @{const_syntax "op -->"};
wenzelm@22377
   651
  val conj = @{const_syntax "op &"};
haftmann@22916
   652
  val less = @{const_syntax less};
haftmann@22916
   653
  val less_eq = @{const_syntax less_eq};
wenzelm@21180
   654
wenzelm@21180
   655
  val trans =
wenzelm@21524
   656
   [((All_binder, impl, less), ("_All_less", "_All_greater")),
wenzelm@21524
   657
    ((All_binder, impl, less_eq), ("_All_less_eq", "_All_greater_eq")),
wenzelm@21524
   658
    ((Ex_binder, conj, less), ("_Ex_less", "_Ex_greater")),
wenzelm@21524
   659
    ((Ex_binder, conj, less_eq), ("_Ex_less_eq", "_Ex_greater_eq"))];
wenzelm@21180
   660
krauss@22344
   661
  fun matches_bound v t = 
krauss@22344
   662
     case t of (Const ("_bound", _) $ Free (v', _)) => (v = v')
krauss@22344
   663
              | _ => false
krauss@22344
   664
  fun contains_var v = Term.exists_subterm (fn Free (x, _) => x = v | _ => false)
krauss@22344
   665
  fun mk v c n P = Syntax.const c $ Syntax.mark_bound v $ n $ P
wenzelm@21180
   666
wenzelm@21180
   667
  fun tr' q = (q,
wenzelm@21180
   668
    fn [Const ("_bound", _) $ Free (v, _), Const (c, _) $ (Const (d, _) $ t $ u) $ P] =>
wenzelm@21180
   669
      (case AList.lookup (op =) trans (q, c, d) of
wenzelm@21180
   670
        NONE => raise Match
wenzelm@21180
   671
      | SOME (l, g) =>
krauss@22344
   672
          if matches_bound v t andalso not (contains_var v u) then mk v l u P
krauss@22344
   673
          else if matches_bound v u andalso not (contains_var v t) then mk v g t P
krauss@22344
   674
          else raise Match)
wenzelm@21180
   675
     | _ => raise Match);
wenzelm@21524
   676
in [tr' All_binder, tr' Ex_binder] end
haftmann@21083
   677
*}
haftmann@21083
   678
haftmann@21083
   679
haftmann@21383
   680
subsection {* Transitivity reasoning *}
haftmann@21383
   681
haftmann@25193
   682
context ord
haftmann@25193
   683
begin
haftmann@21383
   684
haftmann@25193
   685
lemma ord_le_eq_trans: "a \<le> b \<Longrightarrow> b = c \<Longrightarrow> a \<le> c"
haftmann@25193
   686
  by (rule subst)
haftmann@21383
   687
haftmann@25193
   688
lemma ord_eq_le_trans: "a = b \<Longrightarrow> b \<le> c \<Longrightarrow> a \<le> c"
haftmann@25193
   689
  by (rule ssubst)
haftmann@21383
   690
haftmann@25193
   691
lemma ord_less_eq_trans: "a < b \<Longrightarrow> b = c \<Longrightarrow> a < c"
haftmann@25193
   692
  by (rule subst)
haftmann@25193
   693
haftmann@25193
   694
lemma ord_eq_less_trans: "a = b \<Longrightarrow> b < c \<Longrightarrow> a < c"
haftmann@25193
   695
  by (rule ssubst)
haftmann@25193
   696
haftmann@25193
   697
end
haftmann@21383
   698
haftmann@21383
   699
lemma order_less_subst2: "(a::'a::order) < b ==> f b < (c::'c::order) ==>
haftmann@21383
   700
  (!!x y. x < y ==> f x < f y) ==> f a < c"
haftmann@21383
   701
proof -
haftmann@21383
   702
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   703
  assume "a < b" hence "f a < f b" by (rule r)
haftmann@21383
   704
  also assume "f b < c"
haftmann@21383
   705
  finally (order_less_trans) show ?thesis .
haftmann@21383
   706
qed
haftmann@21383
   707
haftmann@21383
   708
lemma order_less_subst1: "(a::'a::order) < f b ==> (b::'b::order) < c ==>
haftmann@21383
   709
  (!!x y. x < y ==> f x < f y) ==> a < f c"
haftmann@21383
   710
proof -
haftmann@21383
   711
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   712
  assume "a < f b"
haftmann@21383
   713
  also assume "b < c" hence "f b < f c" by (rule r)
haftmann@21383
   714
  finally (order_less_trans) show ?thesis .
haftmann@21383
   715
qed
haftmann@21383
   716
haftmann@21383
   717
lemma order_le_less_subst2: "(a::'a::order) <= b ==> f b < (c::'c::order) ==>
haftmann@21383
   718
  (!!x y. x <= y ==> f x <= f y) ==> f a < c"
haftmann@21383
   719
proof -
haftmann@21383
   720
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   721
  assume "a <= b" hence "f a <= f b" by (rule r)
haftmann@21383
   722
  also assume "f b < c"
haftmann@21383
   723
  finally (order_le_less_trans) show ?thesis .
haftmann@21383
   724
qed
haftmann@21383
   725
haftmann@21383
   726
lemma order_le_less_subst1: "(a::'a::order) <= f b ==> (b::'b::order) < c ==>
haftmann@21383
   727
  (!!x y. x < y ==> f x < f y) ==> a < f c"
haftmann@21383
   728
proof -
haftmann@21383
   729
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   730
  assume "a <= f b"
haftmann@21383
   731
  also assume "b < c" hence "f b < f c" by (rule r)
haftmann@21383
   732
  finally (order_le_less_trans) show ?thesis .
haftmann@21383
   733
qed
haftmann@21383
   734
haftmann@21383
   735
lemma order_less_le_subst2: "(a::'a::order) < b ==> f b <= (c::'c::order) ==>
haftmann@21383
   736
  (!!x y. x < y ==> f x < f y) ==> f a < c"
haftmann@21383
   737
proof -
haftmann@21383
   738
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   739
  assume "a < b" hence "f a < f b" by (rule r)
haftmann@21383
   740
  also assume "f b <= c"
haftmann@21383
   741
  finally (order_less_le_trans) show ?thesis .
haftmann@21383
   742
qed
haftmann@21383
   743
haftmann@21383
   744
lemma order_less_le_subst1: "(a::'a::order) < f b ==> (b::'b::order) <= c ==>
haftmann@21383
   745
  (!!x y. x <= y ==> f x <= f y) ==> a < f c"
haftmann@21383
   746
proof -
haftmann@21383
   747
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   748
  assume "a < f b"
haftmann@21383
   749
  also assume "b <= c" hence "f b <= f c" by (rule r)
haftmann@21383
   750
  finally (order_less_le_trans) show ?thesis .
haftmann@21383
   751
qed
haftmann@21383
   752
haftmann@21383
   753
lemma order_subst1: "(a::'a::order) <= f b ==> (b::'b::order) <= c ==>
haftmann@21383
   754
  (!!x y. x <= y ==> f x <= f y) ==> a <= f c"
haftmann@21383
   755
proof -
haftmann@21383
   756
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   757
  assume "a <= f b"
haftmann@21383
   758
  also assume "b <= c" hence "f b <= f c" by (rule r)
haftmann@21383
   759
  finally (order_trans) show ?thesis .
haftmann@21383
   760
qed
haftmann@21383
   761
haftmann@21383
   762
lemma order_subst2: "(a::'a::order) <= b ==> f b <= (c::'c::order) ==>
haftmann@21383
   763
  (!!x y. x <= y ==> f x <= f y) ==> f a <= c"
haftmann@21383
   764
proof -
haftmann@21383
   765
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   766
  assume "a <= b" hence "f a <= f b" by (rule r)
haftmann@21383
   767
  also assume "f b <= c"
haftmann@21383
   768
  finally (order_trans) show ?thesis .
haftmann@21383
   769
qed
haftmann@21383
   770
haftmann@21383
   771
lemma ord_le_eq_subst: "a <= b ==> f b = c ==>
haftmann@21383
   772
  (!!x y. x <= y ==> f x <= f y) ==> f a <= c"
haftmann@21383
   773
proof -
haftmann@21383
   774
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   775
  assume "a <= b" hence "f a <= f b" by (rule r)
haftmann@21383
   776
  also assume "f b = c"
haftmann@21383
   777
  finally (ord_le_eq_trans) show ?thesis .
haftmann@21383
   778
qed
haftmann@21383
   779
haftmann@21383
   780
lemma ord_eq_le_subst: "a = f b ==> b <= c ==>
haftmann@21383
   781
  (!!x y. x <= y ==> f x <= f y) ==> a <= f c"
haftmann@21383
   782
proof -
haftmann@21383
   783
  assume r: "!!x y. x <= y ==> f x <= f y"
haftmann@21383
   784
  assume "a = f b"
haftmann@21383
   785
  also assume "b <= c" hence "f b <= f c" by (rule r)
haftmann@21383
   786
  finally (ord_eq_le_trans) show ?thesis .
haftmann@21383
   787
qed
haftmann@21383
   788
haftmann@21383
   789
lemma ord_less_eq_subst: "a < b ==> f b = c ==>
haftmann@21383
   790
  (!!x y. x < y ==> f x < f y) ==> f a < c"
haftmann@21383
   791
proof -
haftmann@21383
   792
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   793
  assume "a < b" hence "f a < f b" by (rule r)
haftmann@21383
   794
  also assume "f b = c"
haftmann@21383
   795
  finally (ord_less_eq_trans) show ?thesis .
haftmann@21383
   796
qed
haftmann@21383
   797
haftmann@21383
   798
lemma ord_eq_less_subst: "a = f b ==> b < c ==>
haftmann@21383
   799
  (!!x y. x < y ==> f x < f y) ==> a < f c"
haftmann@21383
   800
proof -
haftmann@21383
   801
  assume r: "!!x y. x < y ==> f x < f y"
haftmann@21383
   802
  assume "a = f b"
haftmann@21383
   803
  also assume "b < c" hence "f b < f c" by (rule r)
haftmann@21383
   804
  finally (ord_eq_less_trans) show ?thesis .
haftmann@21383
   805
qed
haftmann@21383
   806
haftmann@21383
   807
text {*
haftmann@21383
   808
  Note that this list of rules is in reverse order of priorities.
haftmann@21383
   809
*}
haftmann@21383
   810
haftmann@21383
   811
lemmas order_trans_rules [trans] =
haftmann@21383
   812
  order_less_subst2
haftmann@21383
   813
  order_less_subst1
haftmann@21383
   814
  order_le_less_subst2
haftmann@21383
   815
  order_le_less_subst1
haftmann@21383
   816
  order_less_le_subst2
haftmann@21383
   817
  order_less_le_subst1
haftmann@21383
   818
  order_subst2
haftmann@21383
   819
  order_subst1
haftmann@21383
   820
  ord_le_eq_subst
haftmann@21383
   821
  ord_eq_le_subst
haftmann@21383
   822
  ord_less_eq_subst
haftmann@21383
   823
  ord_eq_less_subst
haftmann@21383
   824
  forw_subst
haftmann@21383
   825
  back_subst
haftmann@21383
   826
  rev_mp
haftmann@21383
   827
  mp
haftmann@21383
   828
  order_neq_le_trans
haftmann@21383
   829
  order_le_neq_trans
haftmann@21383
   830
  order_less_trans
haftmann@21383
   831
  order_less_asym'
haftmann@21383
   832
  order_le_less_trans
haftmann@21383
   833
  order_less_le_trans
haftmann@21383
   834
  order_trans
haftmann@21383
   835
  order_antisym
haftmann@21383
   836
  ord_le_eq_trans
haftmann@21383
   837
  ord_eq_le_trans
haftmann@21383
   838
  ord_less_eq_trans
haftmann@21383
   839
  ord_eq_less_trans
haftmann@21383
   840
  trans
haftmann@21383
   841
haftmann@21083
   842
wenzelm@21180
   843
(* FIXME cleanup *)
wenzelm@21180
   844
haftmann@21083
   845
text {* These support proving chains of decreasing inequalities
haftmann@21083
   846
    a >= b >= c ... in Isar proofs. *}
haftmann@21083
   847
haftmann@21083
   848
lemma xt1:
haftmann@21083
   849
  "a = b ==> b > c ==> a > c"
haftmann@21083
   850
  "a > b ==> b = c ==> a > c"
haftmann@21083
   851
  "a = b ==> b >= c ==> a >= c"
haftmann@21083
   852
  "a >= b ==> b = c ==> a >= c"
haftmann@21083
   853
  "(x::'a::order) >= y ==> y >= x ==> x = y"
haftmann@21083
   854
  "(x::'a::order) >= y ==> y >= z ==> x >= z"
haftmann@21083
   855
  "(x::'a::order) > y ==> y >= z ==> x > z"
haftmann@21083
   856
  "(x::'a::order) >= y ==> y > z ==> x > z"
wenzelm@23417
   857
  "(a::'a::order) > b ==> b > a ==> P"
haftmann@21083
   858
  "(x::'a::order) > y ==> y > z ==> x > z"
haftmann@21083
   859
  "(a::'a::order) >= b ==> a ~= b ==> a > b"
haftmann@21083
   860
  "(a::'a::order) ~= b ==> a >= b ==> a > b"
haftmann@21083
   861
  "a = f b ==> b > c ==> (!!x y. x > y ==> f x > f y) ==> a > f c" 
haftmann@21083
   862
  "a > b ==> f b = c ==> (!!x y. x > y ==> f x > f y) ==> f a > c"
haftmann@21083
   863
  "a = f b ==> b >= c ==> (!!x y. x >= y ==> f x >= f y) ==> a >= f c"
haftmann@21083
   864
  "a >= b ==> f b = c ==> (!! x y. x >= y ==> f x >= f y) ==> f a >= c"
haftmann@25076
   865
  by auto
haftmann@21083
   866
haftmann@21083
   867
lemma xt2:
haftmann@21083
   868
  "(a::'a::order) >= f b ==> b >= c ==> (!!x y. x >= y ==> f x >= f y) ==> a >= f c"
haftmann@21083
   869
by (subgoal_tac "f b >= f c", force, force)
haftmann@21083
   870
haftmann@21083
   871
lemma xt3: "(a::'a::order) >= b ==> (f b::'b::order) >= c ==> 
haftmann@21083
   872
    (!!x y. x >= y ==> f x >= f y) ==> f a >= c"
haftmann@21083
   873
by (subgoal_tac "f a >= f b", force, force)
haftmann@21083
   874
haftmann@21083
   875
lemma xt4: "(a::'a::order) > f b ==> (b::'b::order) >= c ==>
haftmann@21083
   876
  (!!x y. x >= y ==> f x >= f y) ==> a > f c"
haftmann@21083
   877
by (subgoal_tac "f b >= f c", force, force)
haftmann@21083
   878
haftmann@21083
   879
lemma xt5: "(a::'a::order) > b ==> (f b::'b::order) >= c==>
haftmann@21083
   880
    (!!x y. x > y ==> f x > f y) ==> f a > c"
haftmann@21083
   881
by (subgoal_tac "f a > f b", force, force)
haftmann@21083
   882
haftmann@21083
   883
lemma xt6: "(a::'a::order) >= f b ==> b > c ==>
haftmann@21083
   884
    (!!x y. x > y ==> f x > f y) ==> a > f c"
haftmann@21083
   885
by (subgoal_tac "f b > f c", force, force)
haftmann@21083
   886
haftmann@21083
   887
lemma xt7: "(a::'a::order) >= b ==> (f b::'b::order) > c ==>
haftmann@21083
   888
    (!!x y. x >= y ==> f x >= f y) ==> f a > c"
haftmann@21083
   889
by (subgoal_tac "f a >= f b", force, force)
haftmann@21083
   890
haftmann@21083
   891
lemma xt8: "(a::'a::order) > f b ==> (b::'b::order) > c ==>
haftmann@21083
   892
    (!!x y. x > y ==> f x > f y) ==> a > f c"
haftmann@21083
   893
by (subgoal_tac "f b > f c", force, force)
haftmann@21083
   894
haftmann@21083
   895
lemma xt9: "(a::'a::order) > b ==> (f b::'b::order) > c ==>
haftmann@21083
   896
    (!!x y. x > y ==> f x > f y) ==> f a > c"
haftmann@21083
   897
by (subgoal_tac "f a > f b", force, force)
haftmann@21083
   898
haftmann@21083
   899
lemmas xtrans = xt1 xt2 xt3 xt4 xt5 xt6 xt7 xt8 xt9
haftmann@21083
   900
haftmann@21083
   901
(* 
haftmann@21083
   902
  Since "a >= b" abbreviates "b <= a", the abbreviation "..." stands
haftmann@21083
   903
  for the wrong thing in an Isar proof.
haftmann@21083
   904
haftmann@21083
   905
  The extra transitivity rules can be used as follows: 
haftmann@21083
   906
haftmann@21083
   907
lemma "(a::'a::order) > z"
haftmann@21083
   908
proof -
haftmann@21083
   909
  have "a >= b" (is "_ >= ?rhs")
haftmann@21083
   910
    sorry
haftmann@21083
   911
  also have "?rhs >= c" (is "_ >= ?rhs")
haftmann@21083
   912
    sorry
haftmann@21083
   913
  also (xtrans) have "?rhs = d" (is "_ = ?rhs")
haftmann@21083
   914
    sorry
haftmann@21083
   915
  also (xtrans) have "?rhs >= e" (is "_ >= ?rhs")
haftmann@21083
   916
    sorry
haftmann@21083
   917
  also (xtrans) have "?rhs > f" (is "_ > ?rhs")
haftmann@21083
   918
    sorry
haftmann@21083
   919
  also (xtrans) have "?rhs > z"
haftmann@21083
   920
    sorry
haftmann@21083
   921
  finally (xtrans) show ?thesis .
haftmann@21083
   922
qed
haftmann@21083
   923
haftmann@21083
   924
  Alternatively, one can use "declare xtrans [trans]" and then
haftmann@21083
   925
  leave out the "(xtrans)" above.
haftmann@21083
   926
*)
haftmann@21083
   927
haftmann@21546
   928
subsection {* Order on bool *}
haftmann@21546
   929
haftmann@26324
   930
instantiation bool :: order
haftmann@25510
   931
begin
haftmann@25510
   932
haftmann@25510
   933
definition
haftmann@25510
   934
  le_bool_def [code func del]: "P \<le> Q \<longleftrightarrow> P \<longrightarrow> Q"
haftmann@25510
   935
haftmann@25510
   936
definition
haftmann@25510
   937
  less_bool_def [code func del]: "(P\<Colon>bool) < Q \<longleftrightarrow> P \<le> Q \<and> P \<noteq> Q"
haftmann@25510
   938
haftmann@25510
   939
instance
haftmann@22916
   940
  by intro_classes (auto simp add: le_bool_def less_bool_def)
haftmann@25510
   941
haftmann@25510
   942
end
haftmann@21546
   943
haftmann@21546
   944
lemma le_boolI: "(P \<Longrightarrow> Q) \<Longrightarrow> P \<le> Q"
nipkow@23212
   945
by (simp add: le_bool_def)
haftmann@21546
   946
haftmann@21546
   947
lemma le_boolI': "P \<longrightarrow> Q \<Longrightarrow> P \<le> Q"
nipkow@23212
   948
by (simp add: le_bool_def)
haftmann@21546
   949
haftmann@21546
   950
lemma le_boolE: "P \<le> Q \<Longrightarrow> P \<Longrightarrow> (Q \<Longrightarrow> R) \<Longrightarrow> R"
nipkow@23212
   951
by (simp add: le_bool_def)
haftmann@21546
   952
haftmann@21546
   953
lemma le_boolD: "P \<le> Q \<Longrightarrow> P \<longrightarrow> Q"
nipkow@23212
   954
by (simp add: le_bool_def)
haftmann@21546
   955
haftmann@22348
   956
lemma [code func]:
haftmann@22348
   957
  "False \<le> b \<longleftrightarrow> True"
haftmann@22348
   958
  "True \<le> b \<longleftrightarrow> b"
haftmann@22348
   959
  "False < b \<longleftrightarrow> b"
haftmann@22348
   960
  "True < b \<longleftrightarrow> False"
haftmann@22348
   961
  unfolding le_bool_def less_bool_def by simp_all
haftmann@22348
   962
haftmann@22424
   963
haftmann@23881
   964
subsection {* Order on functions *}
haftmann@23881
   965
haftmann@25510
   966
instantiation "fun" :: (type, ord) ord
haftmann@25510
   967
begin
haftmann@25510
   968
haftmann@25510
   969
definition
haftmann@25510
   970
  le_fun_def [code func del]: "f \<le> g \<longleftrightarrow> (\<forall>x. f x \<le> g x)"
haftmann@23881
   971
haftmann@25510
   972
definition
haftmann@25510
   973
  less_fun_def [code func del]: "(f\<Colon>'a \<Rightarrow> 'b) < g \<longleftrightarrow> f \<le> g \<and> f \<noteq> g"
haftmann@25510
   974
haftmann@25510
   975
instance ..
haftmann@25510
   976
haftmann@25510
   977
end
haftmann@23881
   978
haftmann@23881
   979
instance "fun" :: (type, order) order
haftmann@23881
   980
  by default
berghofe@26796
   981
    (auto simp add: le_fun_def less_fun_def
berghofe@26796
   982
       intro: order_trans order_antisym intro!: ext)
haftmann@23881
   983
haftmann@23881
   984
lemma le_funI: "(\<And>x. f x \<le> g x) \<Longrightarrow> f \<le> g"
haftmann@23881
   985
  unfolding le_fun_def by simp
haftmann@23881
   986
haftmann@23881
   987
lemma le_funE: "f \<le> g \<Longrightarrow> (f x \<le> g x \<Longrightarrow> P) \<Longrightarrow> P"
haftmann@23881
   988
  unfolding le_fun_def by simp
haftmann@23881
   989
haftmann@23881
   990
lemma le_funD: "f \<le> g \<Longrightarrow> f x \<le> g x"
haftmann@23881
   991
  unfolding le_fun_def by simp
haftmann@23881
   992
haftmann@23881
   993
text {*
haftmann@23881
   994
  Handy introduction and elimination rules for @{text "\<le>"}
haftmann@23881
   995
  on unary and binary predicates
haftmann@23881
   996
*}
haftmann@23881
   997
berghofe@26796
   998
lemma predicate1I:
haftmann@23881
   999
  assumes PQ: "\<And>x. P x \<Longrightarrow> Q x"
haftmann@23881
  1000
  shows "P \<le> Q"
haftmann@23881
  1001
  apply (rule le_funI)
haftmann@23881
  1002
  apply (rule le_boolI)
haftmann@23881
  1003
  apply (rule PQ)
haftmann@23881
  1004
  apply assumption
haftmann@23881
  1005
  done
haftmann@23881
  1006
haftmann@23881
  1007
lemma predicate1D [Pure.dest, dest]: "P \<le> Q \<Longrightarrow> P x \<Longrightarrow> Q x"
haftmann@23881
  1008
  apply (erule le_funE)
haftmann@23881
  1009
  apply (erule le_boolE)
haftmann@23881
  1010
  apply assumption+
haftmann@23881
  1011
  done
haftmann@23881
  1012
haftmann@23881
  1013
lemma predicate2I [Pure.intro!, intro!]:
haftmann@23881
  1014
  assumes PQ: "\<And>x y. P x y \<Longrightarrow> Q x y"
haftmann@23881
  1015
  shows "P \<le> Q"
haftmann@23881
  1016
  apply (rule le_funI)+
haftmann@23881
  1017
  apply (rule le_boolI)
haftmann@23881
  1018
  apply (rule PQ)
haftmann@23881
  1019
  apply assumption
haftmann@23881
  1020
  done
haftmann@23881
  1021
haftmann@23881
  1022
lemma predicate2D [Pure.dest, dest]: "P \<le> Q \<Longrightarrow> P x y \<Longrightarrow> Q x y"
haftmann@23881
  1023
  apply (erule le_funE)+
haftmann@23881
  1024
  apply (erule le_boolE)
haftmann@23881
  1025
  apply assumption+
haftmann@23881
  1026
  done
haftmann@23881
  1027
haftmann@23881
  1028
lemma rev_predicate1D: "P x ==> P <= Q ==> Q x"
haftmann@23881
  1029
  by (rule predicate1D)
haftmann@23881
  1030
haftmann@23881
  1031
lemma rev_predicate2D: "P x y ==> P <= Q ==> Q x y"
haftmann@23881
  1032
  by (rule predicate2D)
haftmann@23881
  1033
haftmann@23881
  1034
haftmann@23881
  1035
subsection {* Monotonicity, least value operator and min/max *}
haftmann@21083
  1036
haftmann@25076
  1037
context order
haftmann@25076
  1038
begin
haftmann@25076
  1039
haftmann@25076
  1040
definition
haftmann@25076
  1041
  mono :: "('a \<Rightarrow> 'b\<Colon>order) \<Rightarrow> bool"
haftmann@25076
  1042
where
haftmann@25076
  1043
  "mono f \<longleftrightarrow> (\<forall>x y. x \<le> y \<longrightarrow> f x \<le> f y)"
haftmann@25076
  1044
haftmann@25076
  1045
lemma monoI [intro?]:
haftmann@25076
  1046
  fixes f :: "'a \<Rightarrow> 'b\<Colon>order"
haftmann@25076
  1047
  shows "(\<And>x y. x \<le> y \<Longrightarrow> f x \<le> f y) \<Longrightarrow> mono f"
haftmann@25076
  1048
  unfolding mono_def by iprover
haftmann@21216
  1049
haftmann@25076
  1050
lemma monoD [dest?]:
haftmann@25076
  1051
  fixes f :: "'a \<Rightarrow> 'b\<Colon>order"
haftmann@25076
  1052
  shows "mono f \<Longrightarrow> x \<le> y \<Longrightarrow> f x \<le> f y"
haftmann@25076
  1053
  unfolding mono_def by iprover
haftmann@25076
  1054
haftmann@25076
  1055
end
haftmann@25076
  1056
haftmann@25076
  1057
context linorder
haftmann@25076
  1058
begin
haftmann@25076
  1059
haftmann@25076
  1060
lemma min_of_mono:
haftmann@25076
  1061
  fixes f :: "'a \<Rightarrow> 'b\<Colon>linorder"
wenzelm@25377
  1062
  shows "mono f \<Longrightarrow> min (f m) (f n) = f (min m n)"
haftmann@25076
  1063
  by (auto simp: mono_def Orderings.min_def min_def intro: Orderings.antisym)
haftmann@25076
  1064
haftmann@25076
  1065
lemma max_of_mono:
haftmann@25076
  1066
  fixes f :: "'a \<Rightarrow> 'b\<Colon>linorder"
wenzelm@25377
  1067
  shows "mono f \<Longrightarrow> max (f m) (f n) = f (max m n)"
haftmann@25076
  1068
  by (auto simp: mono_def Orderings.max_def max_def intro: Orderings.antisym)
haftmann@25076
  1069
haftmann@25076
  1070
end
haftmann@21083
  1071
haftmann@21383
  1072
lemma min_leastL: "(!!x. least <= x) ==> min least x = least"
nipkow@23212
  1073
by (simp add: min_def)
haftmann@21383
  1074
haftmann@21383
  1075
lemma max_leastL: "(!!x. least <= x) ==> max least x = x"
nipkow@23212
  1076
by (simp add: max_def)
haftmann@21383
  1077
haftmann@21383
  1078
lemma min_leastR: "(\<And>x\<Colon>'a\<Colon>order. least \<le> x) \<Longrightarrow> min x least = least"
nipkow@23212
  1079
apply (simp add: min_def)
nipkow@23212
  1080
apply (blast intro: order_antisym)
nipkow@23212
  1081
done
haftmann@21383
  1082
haftmann@21383
  1083
lemma max_leastR: "(\<And>x\<Colon>'a\<Colon>order. least \<le> x) \<Longrightarrow> max x least = x"
nipkow@23212
  1084
apply (simp add: max_def)
nipkow@23212
  1085
apply (blast intro: order_antisym)
nipkow@23212
  1086
done
haftmann@21383
  1087
nipkow@15524
  1088
end