src/HOL/Number_Theory/MiscAlgebra.thy
author haftmann
Mon Mar 08 09:38:58 2010 +0100 (2010-03-08)
changeset 35644 d20cf282342e
parent 35416 d8d7d1b785af
child 41541 1fa4725c4656
permissions -rw-r--r--
transfer: avoid camel case
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(*  Title:      MiscAlgebra.thy
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    Author:     Jeremy Avigad
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These are things that can be added to the Algebra library.
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*)
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theory MiscAlgebra
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imports
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  "~~/src/HOL/Algebra/Ring"
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  "~~/src/HOL/Algebra/FiniteProduct"
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begin;
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(* finiteness stuff *)
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lemma bounded_set1_int [intro]: "finite {(x::int). a < x & x < b & P x}" 
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  apply (subgoal_tac "{x. a < x & x < b & P x} <= {a<..<b}")
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  apply (erule finite_subset)
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  apply auto
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done
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(* The rest is for the algebra libraries *)
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(* These go in Group.thy. *)
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(*
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  Show that the units in any monoid give rise to a group.
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  The file Residues.thy provides some infrastructure to use
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  facts about the unit group within the ring locale.
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*)
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definition units_of :: "('a, 'b) monoid_scheme => 'a monoid" where
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  "units_of G == (| carrier = Units G,
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     Group.monoid.mult = Group.monoid.mult G,
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     one  = one G |)";
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(*
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lemma (in monoid) Units_mult_closed [intro]:
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  "x : Units G ==> y : Units G ==> x \<otimes> y : Units G"
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  apply (unfold Units_def)
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  apply (clarsimp)
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  apply (rule_tac x = "xaa \<otimes> xa" in bexI)
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  apply auto
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  apply (subst m_assoc)
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  apply auto
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  apply (subst (2) m_assoc [symmetric])
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  apply auto
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  apply (subst m_assoc)
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  apply auto
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  apply (subst (2) m_assoc [symmetric])
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  apply auto
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done
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*)
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lemma (in monoid) units_group: "group(units_of G)"
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  apply (unfold units_of_def)
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  apply (rule groupI)
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  apply auto
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  apply (subst m_assoc)
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  apply auto
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  apply (rule_tac x = "inv x" in bexI)
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  apply auto
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done
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lemma (in comm_monoid) units_comm_group: "comm_group(units_of G)"
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  apply (rule group.group_comm_groupI)
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  apply (rule units_group)
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  apply (insert prems)
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  apply (unfold units_of_def Units_def comm_monoid_def comm_monoid_axioms_def)
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  apply auto;
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done;
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lemma units_of_carrier: "carrier (units_of G) = Units G"
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  by (unfold units_of_def, auto)
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lemma units_of_mult: "mult(units_of G) = mult G"
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  by (unfold units_of_def, auto)
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lemma units_of_one: "one(units_of G) = one G"
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  by (unfold units_of_def, auto)
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lemma (in monoid) units_of_inv: "x : Units G ==> 
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    m_inv (units_of G) x = m_inv G x"
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  apply (rule sym)
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  apply (subst m_inv_def)
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  apply (rule the1_equality)
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  apply (rule ex_ex1I)
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  apply (subst (asm) Units_def)
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  apply auto
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  apply (erule inv_unique)
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  apply auto
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  apply (rule Units_closed)
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  apply (simp_all only: units_of_carrier [symmetric])
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  apply (insert units_group)
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  apply auto
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  apply (subst units_of_mult [symmetric])
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  apply (subst units_of_one [symmetric])
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  apply (erule group.r_inv, assumption)
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  apply (subst units_of_mult [symmetric])
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  apply (subst units_of_one [symmetric])
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  apply (erule group.l_inv, assumption)
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done
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lemma (in group) inj_on_const_mult: "a: (carrier G) ==> 
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    inj_on (%x. a \<otimes> x) (carrier G)"
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  by (unfold inj_on_def, auto)
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lemma (in group) surj_const_mult: "a : (carrier G) ==>
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    (%x. a \<otimes> x) ` (carrier G) = (carrier G)" 
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  apply (auto simp add: image_def)
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  apply (rule_tac x = "(m_inv G a) \<otimes> x" in bexI)
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  apply auto
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(* auto should get this. I suppose we need "comm_monoid_simprules"
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   for mult_ac rewriting. *)
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  apply (subst m_assoc [symmetric])
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  apply auto
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done
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lemma (in group) l_cancel_one [simp]: "x : carrier G \<Longrightarrow> a : carrier G \<Longrightarrow>
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    (x \<otimes> a = x) = (a = one G)"
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  apply auto
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  apply (subst l_cancel [symmetric])
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  prefer 4
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  apply (erule ssubst)
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  apply auto
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done
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lemma (in group) r_cancel_one [simp]: "x : carrier G \<Longrightarrow> a : carrier G \<Longrightarrow>
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    (a \<otimes> x = x) = (a = one G)"
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  apply auto
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  apply (subst r_cancel [symmetric])
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  prefer 4
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  apply (erule ssubst)
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  apply auto
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done
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(* Is there a better way to do this? *)
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lemma (in group) l_cancel_one' [simp]: "x : carrier G \<Longrightarrow> a : carrier G \<Longrightarrow>
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    (x = x \<otimes> a) = (a = one G)"
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  by (subst eq_commute, simp)
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lemma (in group) r_cancel_one' [simp]: "x : carrier G \<Longrightarrow> a : carrier G \<Longrightarrow>
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    (x = a \<otimes> x) = (a = one G)"
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  by (subst eq_commute, simp)
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(* This should be generalized to arbitrary groups, not just commutative
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   ones, using Lagrange's theorem. *)
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lemma (in comm_group) power_order_eq_one:
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    assumes fin [simp]: "finite (carrier G)"
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        and a [simp]: "a : carrier G" 
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      shows "a (^) card(carrier G) = one G" 
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proof -
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  have "(\<Otimes>x:carrier G. x) = (\<Otimes>x:carrier G. a \<otimes> x)"
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    by (subst (2) finprod_reindex [symmetric], 
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      auto simp add: Pi_def inj_on_const_mult surj_const_mult)
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  also have "\<dots> = (\<Otimes>x:carrier G. a) \<otimes> (\<Otimes>x:carrier G. x)"
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    by (auto simp add: finprod_multf Pi_def)
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  also have "(\<Otimes>x:carrier G. a) = a (^) card(carrier G)"
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    by (auto simp add: finprod_const)
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  finally show ?thesis
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(* uses the preceeding lemma *)
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    by auto
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qed
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(* Miscellaneous *)
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lemma (in cring) field_intro2: "\<zero>\<^bsub>R\<^esub> ~= \<one>\<^bsub>R\<^esub> \<Longrightarrow> ALL x : carrier R - {\<zero>\<^bsub>R\<^esub>}.
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    x : Units R \<Longrightarrow> field R"
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  apply (unfold_locales)
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  apply (insert prems, auto)
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  apply (rule trans)
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  apply (subgoal_tac "a = (a \<otimes> b) \<otimes> inv b")
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  apply assumption
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  apply (subst m_assoc) 
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  apply (auto simp add: Units_r_inv)
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  apply (unfold Units_def)
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  apply auto
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done
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lemma (in monoid) inv_char: "x : carrier G \<Longrightarrow> y : carrier G \<Longrightarrow>
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  x \<otimes> y = \<one> \<Longrightarrow> y \<otimes> x = \<one> \<Longrightarrow> inv x = y"
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  apply (subgoal_tac "x : Units G")
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  apply (subgoal_tac "y = inv x \<otimes> \<one>")
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  apply simp
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  apply (erule subst)
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  apply (subst m_assoc [symmetric])
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  apply auto
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  apply (unfold Units_def)
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  apply auto
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done
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lemma (in comm_monoid) comm_inv_char: "x : carrier G \<Longrightarrow> y : carrier G \<Longrightarrow>
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  x \<otimes> y = \<one> \<Longrightarrow> inv x = y"
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  apply (rule inv_char)
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  apply auto
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  apply (subst m_comm, auto) 
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done
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lemma (in ring) inv_neg_one [simp]: "inv (\<ominus> \<one>) = \<ominus> \<one>"  
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  apply (rule inv_char)
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  apply (auto simp add: l_minus r_minus)
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done
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lemma (in monoid) inv_eq_imp_eq: "x : Units G \<Longrightarrow> y : Units G \<Longrightarrow> 
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    inv x = inv y \<Longrightarrow> x = y"
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  apply (subgoal_tac "inv(inv x) = inv(inv y)")
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  apply (subst (asm) Units_inv_inv)+
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  apply auto
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done
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lemma (in ring) Units_minus_one_closed [intro]: "\<ominus> \<one> : Units R"
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  apply (unfold Units_def)
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  apply auto
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  apply (rule_tac x = "\<ominus> \<one>" in bexI)
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  apply auto
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  apply (simp add: l_minus r_minus)
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done
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lemma (in monoid) inv_one [simp]: "inv \<one> = \<one>"
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  apply (rule inv_char)
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  apply auto
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done
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lemma (in ring) inv_eq_neg_one_eq: "x : Units R \<Longrightarrow> (inv x = \<ominus> \<one>) = (x = \<ominus> \<one>)"
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  apply auto
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  apply (subst Units_inv_inv [symmetric])
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  apply auto
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done
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lemma (in monoid) inv_eq_one_eq: "x : Units G \<Longrightarrow> (inv x = \<one>) = (x = \<one>)"
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  apply auto
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  apply (subst Units_inv_inv [symmetric])
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  apply auto
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done
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(* This goes in FiniteProduct *)
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lemma (in comm_monoid) finprod_UN_disjoint:
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  "finite I \<Longrightarrow> (ALL i:I. finite (A i)) \<longrightarrow> (ALL i:I. ALL j:I. i ~= j \<longrightarrow>
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     (A i) Int (A j) = {}) \<longrightarrow>
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      (ALL i:I. ALL x: (A i). g x : carrier G) \<longrightarrow>
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        finprod G g (UNION I A) = finprod G (%i. finprod G g (A i)) I"
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  apply (induct set: finite)
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  apply force
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  apply clarsimp
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  apply (subst finprod_Un_disjoint)
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  apply blast
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  apply (erule finite_UN_I)
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  apply blast
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  apply (fastsimp)
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  apply (auto intro!: funcsetI finprod_closed) 
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done
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lemma (in comm_monoid) finprod_Union_disjoint:
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  "[| finite C; (ALL A:C. finite A & (ALL x:A. f x : carrier G));
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      (ALL A:C. ALL B:C. A ~= B --> A Int B = {}) |] 
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   ==> finprod G f (Union C) = finprod G (finprod G f) C" 
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  apply (frule finprod_UN_disjoint [of C id f])
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  apply (unfold Union_def id_def, auto)
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done
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lemma (in comm_monoid) finprod_one [rule_format]: 
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  "finite A \<Longrightarrow> (ALL x:A. f x = \<one>) \<longrightarrow>
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     finprod G f A = \<one>"
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by (induct set: finite) auto
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(* need better simplification rules for rings *)
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(* the next one holds more generally for abelian groups *)
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lemma (in cring) sum_zero_eq_neg:
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  "x : carrier R \<Longrightarrow> y : carrier R \<Longrightarrow> x \<oplus> y = \<zero> \<Longrightarrow> x = \<ominus> y"
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  apply (subgoal_tac "\<ominus> y = \<zero> \<oplus> \<ominus> y") 
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  apply (erule ssubst)back
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  apply (erule subst)
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  apply (simp add: ring_simprules)+
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done
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(* there's a name conflict -- maybe "domain" should be
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   "integral_domain" *)
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lemma (in Ring.domain) square_eq_one: 
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  fixes x
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  assumes [simp]: "x : carrier R" and
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    "x \<otimes> x = \<one>"
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  shows "x = \<one> | x = \<ominus>\<one>"
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proof -
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  have "(x \<oplus> \<one>) \<otimes> (x \<oplus> \<ominus> \<one>) = x \<otimes> x \<oplus> \<ominus> \<one>"
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    by (simp add: ring_simprules)
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  also with `x \<otimes> x = \<one>` have "\<dots> = \<zero>"
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    by (simp add: ring_simprules)
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  finally have "(x \<oplus> \<one>) \<otimes> (x \<oplus> \<ominus> \<one>) = \<zero>" .
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  hence "(x \<oplus> \<one>) = \<zero> | (x \<oplus> \<ominus> \<one>) = \<zero>"
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    by (intro integral, auto)
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  thus ?thesis
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    apply auto
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    apply (erule notE)
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    apply (rule sum_zero_eq_neg)
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    apply auto
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    apply (subgoal_tac "x = \<ominus> (\<ominus> \<one>)")
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    apply (simp add: ring_simprules) 
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    apply (rule sum_zero_eq_neg)
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    apply auto
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    done
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qed
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lemma (in Ring.domain) inv_eq_self: "x : Units R \<Longrightarrow>
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    x = inv x \<Longrightarrow> x = \<one> | x = \<ominus> \<one>"
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  apply (rule square_eq_one)
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  apply auto
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  apply (erule ssubst)back
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  apply (erule Units_r_inv)
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done
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(*
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  The following translates theorems about groups to the facts about
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  the units of a ring. (The list should be expanded as more things are
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  needed.)
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*)
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lemma (in ring) finite_ring_finite_units [intro]: "finite (carrier R) \<Longrightarrow> 
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    finite (Units R)"
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  by (rule finite_subset, auto)
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(* this belongs with MiscAlgebra.thy *)
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lemma (in monoid) units_of_pow: 
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    "x : Units G \<Longrightarrow> x (^)\<^bsub>units_of G\<^esub> (n::nat) = x (^)\<^bsub>G\<^esub> n"
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  apply (induct n)
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  apply (auto simp add: units_group group.is_monoid  
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    monoid.nat_pow_0 monoid.nat_pow_Suc units_of_one units_of_mult
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    One_nat_def)
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done
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lemma (in cring) units_power_order_eq_one: "finite (Units R) \<Longrightarrow> a : Units R
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    \<Longrightarrow> a (^) card(Units R) = \<one>"
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  apply (subst units_of_carrier [symmetric])
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  apply (subst units_of_one [symmetric])
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  apply (subst units_of_pow [symmetric])
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  apply assumption
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  apply (rule comm_group.power_order_eq_one)
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  apply (rule units_comm_group)
nipkow@31719
   351
  apply (unfold units_of_def, auto)
nipkow@31719
   352
done
nipkow@31719
   353
nipkow@31719
   354
end