src/HOL/Algebra/Group.thy
author wenzelm
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(*
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  Title:  HOL/Algebra/Group.thy
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  Id:     $Id$
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  Author: Clemens Ballarin, started 4 February 2003
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Based on work by Florian Kammueller, L C Paulson and Markus Wenzel.
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*)
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header {* Groups *}
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theory Group = FuncSet:
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section {* From Magmas to Groups *}
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text {*
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  Definitions follow Jacobson, Basic Algebra I, Freeman, 1985; with
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  the exception of \emph{magma} which, following Bourbaki, is a set
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  together with a binary, closed operation.
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*}
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subsection {* Definitions *}
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(* Object with a carrier set. *)
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record 'a partial_object =
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  carrier :: "'a set"
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record 'a semigroup = "'a partial_object" +
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  mult :: "['a, 'a] => 'a" (infixl "\<otimes>\<index>" 70)
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record 'a monoid = "'a semigroup" +
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  one :: 'a ("\<one>\<index>")
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constdefs (structure G)
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  m_inv :: "_ => 'a => 'a" ("inv\<index> _" [81] 80)
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  "inv x == (THE y. y \<in> carrier G & x \<otimes> y = \<one> & y \<otimes> x = \<one>)"
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  Units :: "_ => 'a set"
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  "Units G == {y. y \<in> carrier G & (EX x : carrier G. x \<otimes> y = \<one> & y \<otimes> x = \<one>)}"
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consts
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  pow :: "[('a, 'm) monoid_scheme, 'a, 'b::number] => 'a" (infixr "'(^')\<index>" 75)
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defs (overloaded)
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  nat_pow_def: "pow G a n == nat_rec \<one>\<^bsub>G\<^esub> (%u b. b \<otimes>\<^bsub>G\<^esub> a) n"
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  int_pow_def: "pow G a z ==
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    let p = nat_rec \<one>\<^bsub>G\<^esub> (%u b. b \<otimes>\<^bsub>G\<^esub> a)
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    in if neg z then inv\<^bsub>G\<^esub> (p (nat (-z))) else p (nat z)"
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locale magma = struct G +
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  assumes m_closed [intro, simp]:
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    "[| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y \<in> carrier G"
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locale semigroup = magma +
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  assumes m_assoc:
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    "[| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
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    (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)"
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locale monoid = semigroup +
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  assumes one_closed [intro, simp]: "\<one> \<in> carrier G"
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    and l_one [simp]: "x \<in> carrier G ==> \<one> \<otimes> x = x"
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    and r_one [simp]: "x \<in> carrier G ==> x \<otimes> \<one> = x"
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lemma monoidI:
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  includes struct G
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  assumes m_closed:
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      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y \<in> carrier G"
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    and one_closed: "\<one> \<in> carrier G"
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    and m_assoc:
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      "!!x y z. [| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
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      (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)"
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    and l_one: "!!x. x \<in> carrier G ==> \<one> \<otimes> x = x"
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    and r_one: "!!x. x \<in> carrier G ==> x \<otimes> \<one> = x"
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  shows "monoid G"
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  by (fast intro!: monoid.intro magma.intro semigroup_axioms.intro
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    semigroup.intro monoid_axioms.intro
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    intro: prems)
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lemma (in monoid) Units_closed [dest]:
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  "x \<in> Units G ==> x \<in> carrier G"
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  by (unfold Units_def) fast
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lemma (in monoid) inv_unique:
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  assumes eq: "y \<otimes> x = \<one>"  "x \<otimes> y' = \<one>"
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    and G: "x \<in> carrier G"  "y \<in> carrier G"  "y' \<in> carrier G"
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  shows "y = y'"
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proof -
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  from G eq have "y = y \<otimes> (x \<otimes> y')" by simp
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  also from G have "... = (y \<otimes> x) \<otimes> y'" by (simp add: m_assoc)
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  also from G eq have "... = y'" by simp
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  finally show ?thesis .
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qed
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lemma (in monoid) Units_one_closed [intro, simp]:
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  "\<one> \<in> Units G"
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  by (unfold Units_def) auto
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lemma (in monoid) Units_inv_closed [intro, simp]:
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  "x \<in> Units G ==> inv x \<in> carrier G"
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  apply (unfold Units_def m_inv_def, auto)
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  apply (rule theI2, fast)
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   apply (fast intro: inv_unique, fast)
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  done
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lemma (in monoid) Units_l_inv:
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  "x \<in> Units G ==> inv x \<otimes> x = \<one>"
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  apply (unfold Units_def m_inv_def, auto)
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  apply (rule theI2, fast)
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   apply (fast intro: inv_unique, fast)
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  done
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lemma (in monoid) Units_r_inv:
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  "x \<in> Units G ==> x \<otimes> inv x = \<one>"
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  apply (unfold Units_def m_inv_def, auto)
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  apply (rule theI2, fast)
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   apply (fast intro: inv_unique, fast)
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  done
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lemma (in monoid) Units_inv_Units [intro, simp]:
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  "x \<in> Units G ==> inv x \<in> Units G"
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proof -
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  assume x: "x \<in> Units G"
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  show "inv x \<in> Units G"
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    by (auto simp add: Units_def
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      intro: Units_l_inv Units_r_inv x Units_closed [OF x])
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qed
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lemma (in monoid) Units_l_cancel [simp]:
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  "[| x \<in> Units G; y \<in> carrier G; z \<in> carrier G |] ==>
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   (x \<otimes> y = x \<otimes> z) = (y = z)"
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proof
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  assume eq: "x \<otimes> y = x \<otimes> z"
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    and G: "x \<in> Units G"  "y \<in> carrier G"  "z \<in> carrier G"
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  then have "(inv x \<otimes> x) \<otimes> y = (inv x \<otimes> x) \<otimes> z"
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    by (simp add: m_assoc Units_closed)
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  with G show "y = z" by (simp add: Units_l_inv)
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next
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  assume eq: "y = z"
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    and G: "x \<in> Units G"  "y \<in> carrier G"  "z \<in> carrier G"
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  then show "x \<otimes> y = x \<otimes> z" by simp
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qed
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lemma (in monoid) Units_inv_inv [simp]:
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  "x \<in> Units G ==> inv (inv x) = x"
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proof -
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  assume x: "x \<in> Units G"
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  then have "inv x \<otimes> inv (inv x) = inv x \<otimes> x"
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    by (simp add: Units_l_inv Units_r_inv)
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  with x show ?thesis by (simp add: Units_closed)
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qed
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lemma (in monoid) inv_inj_on_Units:
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  "inj_on (m_inv G) (Units G)"
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proof (rule inj_onI)
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  fix x y
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  assume G: "x \<in> Units G"  "y \<in> Units G" and eq: "inv x = inv y"
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parents: 13854
diff changeset
   157
  then have "inv (inv x) = inv (inv y)" by simp
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   158
  with G show "x = y" by simp
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   159
qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   160
13940
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   161
lemma (in monoid) Units_inv_comm:
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   162
  assumes inv: "x \<otimes> y = \<one>"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   163
    and G: "x \<in> Units G"  "y \<in> Units G"
13940
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   164
  shows "y \<otimes> x = \<one>"
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   165
proof -
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   166
  from G have "x \<otimes> y \<otimes> x = x \<otimes> \<one>" by (auto simp add: inv Units_closed)
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   167
  with G show ?thesis by (simp del: r_one add: m_assoc Units_closed)
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   168
qed
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   169
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   170
text {* Power *}
d3671b878828 Greatly extended CRing. Added Module.
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parents: 13854
diff changeset
   171
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   172
lemma (in monoid) nat_pow_closed [intro, simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   173
  "x \<in> carrier G ==> x (^) (n::nat) \<in> carrier G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   174
  by (induct n) (simp_all add: nat_pow_def)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   175
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   176
lemma (in monoid) nat_pow_0 [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   177
  "x (^) (0::nat) = \<one>"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   178
  by (simp add: nat_pow_def)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   179
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   180
lemma (in monoid) nat_pow_Suc [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   181
  "x (^) (Suc n) = x (^) n \<otimes> x"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   182
  by (simp add: nat_pow_def)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   183
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   184
lemma (in monoid) nat_pow_one [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   185
  "\<one> (^) (n::nat) = \<one>"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   186
  by (induct n) simp_all
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   187
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   188
lemma (in monoid) nat_pow_mult:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   189
  "x \<in> carrier G ==> x (^) (n::nat) \<otimes> x (^) m = x (^) (n + m)"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   190
  by (induct m) (simp_all add: m_assoc [THEN sym])
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   191
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   192
lemma (in monoid) nat_pow_pow:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   193
  "x \<in> carrier G ==> (x (^) n) (^) m = x (^) (n * m::nat)"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   194
  by (induct m) (simp, simp add: nat_pow_mult add_commute)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   195
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   196
text {*
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   197
  A group is a monoid all of whose elements are invertible.
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   198
*}
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   199
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   200
locale group = monoid +
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   201
  assumes Units: "carrier G <= Units G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   202
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   203
theorem groupI:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   204
  includes struct G
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   205
  assumes m_closed [simp]:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   206
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y \<in> carrier G"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   207
    and one_closed [simp]: "\<one> \<in> carrier G"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   208
    and m_assoc:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   209
      "!!x y z. [| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   210
      (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   211
    and l_one [simp]: "!!x. x \<in> carrier G ==> \<one> \<otimes> x = x"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   212
    and l_inv_ex: "!!x. x \<in> carrier G ==> EX y : carrier G. y \<otimes> x = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   213
  shows "group G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   214
proof -
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   215
  have l_cancel [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   216
    "!!x y z. [| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   217
    (x \<otimes> y = x \<otimes> z) = (y = z)"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   218
  proof
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   219
    fix x y z
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   220
    assume eq: "x \<otimes> y = x \<otimes> z"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   221
      and G: "x \<in> carrier G"  "y \<in> carrier G"  "z \<in> carrier G"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   222
    with l_inv_ex obtain x_inv where xG: "x_inv \<in> carrier G"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   223
      and l_inv: "x_inv \<otimes> x = \<one>" by fast
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   224
    from G eq xG have "(x_inv \<otimes> x) \<otimes> y = (x_inv \<otimes> x) \<otimes> z"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   225
      by (simp add: m_assoc)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   226
    with G show "y = z" by (simp add: l_inv)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   227
  next
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   228
    fix x y z
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   229
    assume eq: "y = z"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   230
      and G: "x \<in> carrier G"  "y \<in> carrier G"  "z \<in> carrier G"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   231
    then show "x \<otimes> y = x \<otimes> z" by simp
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   232
  qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   233
  have r_one:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   234
    "!!x. x \<in> carrier G ==> x \<otimes> \<one> = x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   235
  proof -
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   236
    fix x
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   237
    assume x: "x \<in> carrier G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   238
    with l_inv_ex obtain x_inv where xG: "x_inv \<in> carrier G"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   239
      and l_inv: "x_inv \<otimes> x = \<one>" by fast
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   240
    from x xG have "x_inv \<otimes> (x \<otimes> \<one>) = x_inv \<otimes> x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   241
      by (simp add: m_assoc [symmetric] l_inv)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   242
    with x xG show "x \<otimes> \<one> = x" by simp
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   243
  qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   244
  have inv_ex:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   245
    "!!x. x \<in> carrier G ==> EX y : carrier G. y \<otimes> x = \<one> & x \<otimes> y = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   246
  proof -
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   247
    fix x
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   248
    assume x: "x \<in> carrier G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   249
    with l_inv_ex obtain y where y: "y \<in> carrier G"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   250
      and l_inv: "y \<otimes> x = \<one>" by fast
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   251
    from x y have "y \<otimes> (x \<otimes> y) = y \<otimes> \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   252
      by (simp add: m_assoc [symmetric] l_inv r_one)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   253
    with x y have r_inv: "x \<otimes> y = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   254
      by simp
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   255
    from x y show "EX y : carrier G. y \<otimes> x = \<one> & x \<otimes> y = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   256
      by (fast intro: l_inv r_inv)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   257
  qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   258
  then have carrier_subset_Units: "carrier G <= Units G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   259
    by (unfold Units_def) fast
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   260
  show ?thesis
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   261
    by (fast intro!: group.intro magma.intro semigroup_axioms.intro
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   262
      semigroup.intro monoid_axioms.intro group_axioms.intro
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   263
      carrier_subset_Units intro: prems r_one)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   264
qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   265
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   266
lemma (in monoid) monoid_groupI:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   267
  assumes l_inv_ex:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   268
    "!!x. x \<in> carrier G ==> EX y : carrier G. y \<otimes> x = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   269
  shows "group G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   270
  by (rule groupI) (auto intro: m_assoc l_inv_ex)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   271
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   272
lemma (in group) Units_eq [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   273
  "Units G = carrier G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   274
proof
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   275
  show "Units G <= carrier G" by fast
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   276
next
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   277
  show "carrier G <= Units G" by (rule Units)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   278
qed
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   279
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   280
lemma (in group) inv_closed [intro, simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   281
  "x \<in> carrier G ==> inv x \<in> carrier G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   282
  using Units_inv_closed by simp
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   283
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   284
lemma (in group) l_inv:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   285
  "x \<in> carrier G ==> inv x \<otimes> x = \<one>"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   286
  using Units_l_inv by simp
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   287
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   288
subsection {* Cancellation Laws and Basic Properties *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   289
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   290
lemma (in group) l_cancel [simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   291
  "[| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   292
   (x \<otimes> y = x \<otimes> z) = (y = z)"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   293
  using Units_l_inv by simp
13940
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   294
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   295
lemma (in group) r_inv:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   296
  "x \<in> carrier G ==> x \<otimes> inv x = \<one>"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   297
proof -
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   298
  assume x: "x \<in> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   299
  then have "inv x \<otimes> (x \<otimes> inv x) = inv x \<otimes> \<one>"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   300
    by (simp add: m_assoc [symmetric] l_inv)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   301
  with x show ?thesis by (simp del: r_one)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   302
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   303
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   304
lemma (in group) r_cancel [simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   305
  "[| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   306
   (y \<otimes> x = z \<otimes> x) = (y = z)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   307
proof
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   308
  assume eq: "y \<otimes> x = z \<otimes> x"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   309
    and G: "x \<in> carrier G"  "y \<in> carrier G"  "z \<in> carrier G"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   310
  then have "y \<otimes> (x \<otimes> inv x) = z \<otimes> (x \<otimes> inv x)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   311
    by (simp add: m_assoc [symmetric])
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   312
  with G show "y = z" by (simp add: r_inv)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   313
next
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   314
  assume eq: "y = z"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   315
    and G: "x \<in> carrier G"  "y \<in> carrier G"  "z \<in> carrier G"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   316
  then show "y \<otimes> x = z \<otimes> x" by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   317
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   318
13854
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   319
lemma (in group) inv_one [simp]:
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   320
  "inv \<one> = \<one>"
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   321
proof -
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   322
  have "inv \<one> = \<one> \<otimes> (inv \<one>)" by simp
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   323
  moreover have "... = \<one>" by (simp add: r_inv)
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   324
  finally show ?thesis .
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   325
qed
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   326
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   327
lemma (in group) inv_inv [simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   328
  "x \<in> carrier G ==> inv (inv x) = x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   329
  using Units_inv_inv by simp
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   330
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   331
lemma (in group) inv_inj:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   332
  "inj_on (m_inv G) (carrier G)"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   333
  using inv_inj_on_Units by simp
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   334
13854
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   335
lemma (in group) inv_mult_group:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   336
  "[| x \<in> carrier G; y \<in> carrier G |] ==> inv (x \<otimes> y) = inv y \<otimes> inv x"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   337
proof -
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   338
  assume G: "x \<in> carrier G"  "y \<in> carrier G"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   339
  then have "inv (x \<otimes> y) \<otimes> (x \<otimes> y) = (inv y \<otimes> inv x) \<otimes> (x \<otimes> y)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   340
    by (simp add: m_assoc l_inv) (simp add: m_assoc [symmetric] l_inv)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   341
  with G show ?thesis by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   342
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   343
13940
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   344
lemma (in group) inv_comm:
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   345
  "[| x \<otimes> y = \<one>; x \<in> carrier G; y \<in> carrier G |] ==> y \<otimes> x = \<one>"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   346
  by (rule Units_inv_comm) auto
13940
c67798653056 HOL-Algebra: New polynomial development added.
ballarin
parents: 13936
diff changeset
   347
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   348
lemma (in group) inv_equality:
13943
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   349
     "[|y \<otimes> x = \<one>; x \<in> carrier G; y \<in> carrier G|] ==> inv x = y"
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   350
apply (simp add: m_inv_def)
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   351
apply (rule the_equality)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   352
 apply (simp add: inv_comm [of y x])
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   353
apply (rule r_cancel [THEN iffD1], auto)
13943
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   354
done
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   355
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   356
text {* Power *}
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   357
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   358
lemma (in group) int_pow_def2:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   359
  "a (^) (z::int) = (if neg z then inv (a (^) (nat (-z))) else a (^) (nat z))"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   360
  by (simp add: int_pow_def nat_pow_def Let_def)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   361
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   362
lemma (in group) int_pow_0 [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   363
  "x (^) (0::int) = \<one>"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   364
  by (simp add: int_pow_def2)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   365
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   366
lemma (in group) int_pow_one [simp]:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   367
  "\<one> (^) (z::int) = \<one>"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   368
  by (simp add: int_pow_def2)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   369
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   370
subsection {* Substructures *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   371
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   372
locale submagma = var H + struct G +
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   373
  assumes subset [intro, simp]: "H \<subseteq> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   374
    and m_closed [intro, simp]: "[| x \<in> H; y \<in> H |] ==> x \<otimes> y \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   375
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   376
declare (in submagma) magma.intro [intro] semigroup.intro [intro]
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   377
  semigroup_axioms.intro [intro]
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   378
(*
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   379
alternative definition of submagma
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   380
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   381
locale submagma = var H + struct G +
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   382
  assumes subset [intro, simp]: "carrier H \<subseteq> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   383
    and m_equal [simp]: "mult H = mult G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   384
    and m_closed [intro, simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   385
      "[| x \<in> carrier H; y \<in> carrier H |] ==> x \<otimes> y \<in> carrier H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   386
*)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   387
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   388
lemma submagma_imp_subset:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   389
  "submagma H G ==> H \<subseteq> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   390
  by (rule submagma.subset)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   391
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   392
lemma (in submagma) subsetD [dest, simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   393
  "x \<in> H ==> x \<in> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   394
  using subset by blast
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   395
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   396
lemma (in submagma) magmaI [intro]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   397
  includes magma G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   398
  shows "magma (G(| carrier := H |))"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   399
  by rule simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   400
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   401
lemma (in submagma) semigroup_axiomsI [intro]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   402
  includes semigroup G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   403
  shows "semigroup_axioms (G(| carrier := H |))"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   404
    by rule (simp add: m_assoc)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   405
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   406
lemma (in submagma) semigroupI [intro]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   407
  includes semigroup G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   408
  shows "semigroup (G(| carrier := H |))"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   409
  using prems by fast
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   410
14551
2cb6ff394bfb Various changes to HOL-Algebra;
ballarin
parents: 14286
diff changeset
   411
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   412
locale subgroup = submagma H G +
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   413
  assumes one_closed [intro, simp]: "\<one> \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   414
    and m_inv_closed [intro, simp]: "x \<in> H ==> inv x \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   415
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   416
declare (in subgroup) group.intro [intro]
13949
0ce528cd6f19 HOL-Algebra complete for release Isabelle2003 (modulo section headers).
ballarin
parents: 13944
diff changeset
   417
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   418
lemma (in subgroup) group_axiomsI [intro]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   419
  includes group G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   420
  shows "group_axioms (G(| carrier := H |))"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   421
  by (rule group_axioms.intro) (auto intro: l_inv r_inv simp add: Units_def)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   422
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   423
lemma (in subgroup) groupI [intro]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   424
  includes group G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   425
  shows "group (G(| carrier := H |))"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   426
  by (rule groupI) (auto intro: m_assoc l_inv)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   427
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   428
text {*
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   429
  Since @{term H} is nonempty, it contains some element @{term x}.  Since
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   430
  it is closed under inverse, it contains @{text "inv x"}.  Since
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   431
  it is closed under product, it contains @{text "x \<otimes> inv x = \<one>"}.
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   432
*}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   433
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   434
lemma (in group) one_in_subset:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   435
  "[| H \<subseteq> carrier G; H \<noteq> {}; \<forall>a \<in> H. inv a \<in> H; \<forall>a\<in>H. \<forall>b\<in>H. a \<otimes> b \<in> H |]
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   436
   ==> \<one> \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   437
by (force simp add: l_inv)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   438
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   439
text {* A characterization of subgroups: closed, non-empty subset. *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   440
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   441
lemma (in group) subgroupI:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   442
  assumes subset: "H \<subseteq> carrier G" and non_empty: "H \<noteq> {}"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   443
    and inv: "!!a. a \<in> H ==> inv a \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   444
    and mult: "!!a b. [|a \<in> H; b \<in> H|] ==> a \<otimes> b \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   445
  shows "subgroup H G"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   446
proof (rule subgroup.intro)
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   447
  from subset and mult show "submagma H G" by (rule submagma.intro)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   448
next
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   449
  have "\<one> \<in> H" by (rule one_in_subset) (auto simp only: prems)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   450
  with inv show "subgroup_axioms H G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   451
    by (intro subgroup_axioms.intro) simp_all
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   452
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   453
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   454
text {*
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   455
  Repeat facts of submagmas for subgroups.  Necessary???
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   456
*}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   457
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   458
lemma (in subgroup) subset:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   459
  "H \<subseteq> carrier G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   460
  ..
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   461
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   462
lemma (in subgroup) m_closed:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   463
  "[| x \<in> H; y \<in> H |] ==> x \<otimes> y \<in> H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   464
  ..
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   465
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   466
declare magma.m_closed [simp]
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   467
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   468
declare monoid.one_closed [iff] group.inv_closed [simp]
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   469
  monoid.l_one [simp] monoid.r_one [simp] group.inv_inv [simp]
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   470
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   471
lemma subgroup_nonempty:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   472
  "~ subgroup {} G"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   473
  by (blast dest: subgroup.one_closed)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   474
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   475
lemma (in subgroup) finite_imp_card_positive:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   476
  "finite (carrier G) ==> 0 < card H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   477
proof (rule classical)
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   478
  have sub: "subgroup H G" using prems by (rule subgroup.intro)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   479
  assume fin: "finite (carrier G)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   480
    and zero: "~ 0 < card H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   481
  then have "finite H" by (blast intro: finite_subset dest: subset)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   482
  with zero sub have "subgroup {} G" by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   483
  with subgroup_nonempty show ?thesis by contradiction
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   484
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   485
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   486
(*
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   487
lemma (in monoid) Units_subgroup:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   488
  "subgroup (Units G) G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   489
*)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   490
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   491
subsection {* Direct Products *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   492
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   493
constdefs (structure G and H)
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   494
  DirProdSemigroup :: "_ => _ => ('a \<times> 'b) semigroup"  (infixr "\<times>\<^sub>s" 80)
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   495
  "G \<times>\<^sub>s H == (| carrier = carrier G \<times> carrier H,
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   496
    mult = (%(g, h) (g', h'). (g \<otimes>\<^bsub>G\<^esub> g', h \<otimes>\<^bsub>H\<^esub> h')) |)"
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   497
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   498
  DirProdGroup :: "_ => _ => ('a \<times> 'b) monoid"  (infixr "\<times>\<^sub>g" 80)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   499
  "G \<times>\<^sub>g H == semigroup.extend (G \<times>\<^sub>s H) (| one = (\<one>\<^bsub>G\<^esub>, \<one>\<^bsub>H\<^esub>) |)"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   500
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   501
lemma DirProdSemigroup_magma:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   502
  includes magma G + magma H
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   503
  shows "magma (G \<times>\<^sub>s H)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   504
  by (rule magma.intro) (auto simp add: DirProdSemigroup_def)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   505
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   506
lemma DirProdSemigroup_semigroup_axioms:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   507
  includes semigroup G + semigroup H
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   508
  shows "semigroup_axioms (G \<times>\<^sub>s H)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   509
  by (rule semigroup_axioms.intro)
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   510
    (auto simp add: DirProdSemigroup_def G.m_assoc H.m_assoc)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   511
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   512
lemma DirProdSemigroup_semigroup:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   513
  includes semigroup G + semigroup H
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   514
  shows "semigroup (G \<times>\<^sub>s H)"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   515
  using prems
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   516
  by (fast intro: semigroup.intro
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   517
    DirProdSemigroup_magma DirProdSemigroup_semigroup_axioms)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   518
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   519
lemma DirProdGroup_magma:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   520
  includes magma G + magma H
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   521
  shows "magma (G \<times>\<^sub>g H)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   522
  by (rule magma.intro)
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   523
    (auto simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   524
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   525
lemma DirProdGroup_semigroup_axioms:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   526
  includes semigroup G + semigroup H
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   527
  shows "semigroup_axioms (G \<times>\<^sub>g H)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   528
  by (rule semigroup_axioms.intro)
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   529
    (auto simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   530
      G.m_assoc H.m_assoc)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   531
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   532
lemma DirProdGroup_semigroup:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   533
  includes semigroup G + semigroup H
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   534
  shows "semigroup (G \<times>\<^sub>g H)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   535
  using prems
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   536
  by (fast intro: semigroup.intro
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   537
    DirProdGroup_magma DirProdGroup_semigroup_axioms)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   538
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   539
text {* \dots\ and further lemmas for group \dots *}
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   540
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   541
lemma DirProdGroup_group:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   542
  includes group G + group H
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   543
  shows "group (G \<times>\<^sub>g H)"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   544
  by (rule groupI)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   545
    (auto intro: G.m_assoc H.m_assoc G.l_inv H.l_inv
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   546
      simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   547
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   548
lemma carrier_DirProdGroup [simp]:
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   549
     "carrier (G \<times>\<^sub>g H) = carrier G \<times> carrier H"
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   550
  by (simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs)
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   551
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   552
lemma one_DirProdGroup [simp]:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   553
     "\<one>\<^bsub>(G \<times>\<^sub>g H)\<^esub> = (\<one>\<^bsub>G\<^esub>, \<one>\<^bsub>H\<^esub>)"
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   554
  by (simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs)
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   555
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   556
lemma mult_DirProdGroup [simp]:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   557
     "(g, h) \<otimes>\<^bsub>(G \<times>\<^sub>g H)\<^esub> (g', h') = (g \<otimes>\<^bsub>G\<^esub> g', h \<otimes>\<^bsub>H\<^esub> h')"
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   558
  by (simp add: DirProdGroup_def DirProdSemigroup_def semigroup.defs)
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   559
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   560
lemma inv_DirProdGroup [simp]:
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   561
  includes group G + group H
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   562
  assumes g: "g \<in> carrier G"
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   563
      and h: "h \<in> carrier H"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   564
  shows "m_inv (G \<times>\<^sub>g H) (g, h) = (inv\<^bsub>G\<^esub> g, inv\<^bsub>H\<^esub> h)"
13944
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   565
  apply (rule group.inv_equality [OF DirProdGroup_group])
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   566
  apply (simp_all add: prems group_def group.l_inv)
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   567
  done
9b34607cd83e new proofs about direct products, etc.
paulson
parents: 13943
diff changeset
   568
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   569
subsection {* Homomorphisms *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   570
14651
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   571
constdefs (structure G and H)
02b8f3bcf7fe improved notation;
wenzelm
parents: 14551
diff changeset
   572
  hom :: "_ => _ => ('a => 'b) set"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   573
  "hom G H ==
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   574
    {h. h \<in> carrier G -> carrier H &
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   575
      (\<forall>x \<in> carrier G. \<forall>y \<in> carrier G. h (x \<otimes>\<^bsub>G\<^esub> y) = h x \<otimes>\<^bsub>H\<^esub> h y)}"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   576
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   577
lemma (in semigroup) hom:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   578
  includes semigroup G
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   579
  shows "semigroup (| carrier = hom G G, mult = op o |)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   580
proof (rule semigroup.intro)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   581
  show "magma (| carrier = hom G G, mult = op o |)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   582
    by (rule magma.intro) (simp add: Pi_def hom_def)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   583
next
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   584
  show "semigroup_axioms (| carrier = hom G G, mult = op o |)"
14254
342634f38451 Isar/Locales: <loc>.intro and <loc>.axioms no longer intro? and elim? by
ballarin
parents: 13975
diff changeset
   585
    by (rule semigroup_axioms.intro) (simp add: o_assoc)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   586
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   587
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   588
lemma hom_mult:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   589
  "[| h \<in> hom G H; x \<in> carrier G; y \<in> carrier G |]
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   590
   ==> h (x \<otimes>\<^bsub>G\<^esub> y) = h x \<otimes>\<^bsub>H\<^esub> h y"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   591
  by (simp add: hom_def)
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   592
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   593
lemma hom_closed:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   594
  "[| h \<in> hom G H; x \<in> carrier G |] ==> h x \<in> carrier H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   595
  by (auto simp add: hom_def funcset_mem)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   596
13943
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   597
lemma compose_hom:
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   598
     "[|group G; h \<in> hom G G; h' \<in> hom G G; h' \<in> carrier G -> carrier G|]
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   599
      ==> compose (carrier G) h h' \<in> hom G G"
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   600
apply (simp (no_asm_simp) add: hom_def)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   601
apply (intro conjI)
13943
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   602
 apply (force simp add: funcset_compose hom_def)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   603
apply (simp add: compose_def group.axioms hom_mult funcset_mem)
13943
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   604
done
83d842ccd4aa moving Bij.thy from GroupTheory to Algebra
paulson
parents: 13940
diff changeset
   605
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   606
locale group_hom = group G + group H + var h +
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   607
  assumes homh: "h \<in> hom G H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   608
  notes hom_mult [simp] = hom_mult [OF homh]
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   609
    and hom_closed [simp] = hom_closed [OF homh]
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   610
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   611
lemma (in group_hom) one_closed [simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   612
  "h \<one> \<in> carrier H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   613
  by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   614
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   615
lemma (in group_hom) hom_one [simp]:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   616
  "h \<one> = \<one>\<^bsub>H\<^esub>"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   617
proof -
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   618
  have "h \<one> \<otimes>\<^bsub>H\<^esub> \<one>\<^bsub>H\<^esub> = h \<one> \<otimes>\<^sub>2 h \<one>"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   619
    by (simp add: hom_mult [symmetric] del: hom_mult)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   620
  then show ?thesis by (simp del: r_one)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   621
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   622
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   623
lemma (in group_hom) inv_closed [simp]:
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   624
  "x \<in> carrier G ==> h (inv x) \<in> carrier H"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   625
  by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   626
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   627
lemma (in group_hom) hom_inv [simp]:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   628
  "x \<in> carrier G ==> h (inv x) = inv\<^bsub>H\<^esub> (h x)"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   629
proof -
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   630
  assume x: "x \<in> carrier G"
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   631
  then have "h x \<otimes>\<^bsub>H\<^esub> h (inv x) = \<one>\<^bsub>H\<^esub>"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   632
    by (simp add: hom_mult [symmetric] G.r_inv del: hom_mult)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   633
  also from x have "... = h x \<otimes>\<^bsub>H\<^esub> inv\<^bsub>H\<^esub> (h x)"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   634
    by (simp add: hom_mult [symmetric] H.r_inv del: hom_mult)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   635
  finally have "h x \<otimes>\<^bsub>H\<^esub> h (inv x) = h x \<otimes>\<^bsub>H\<^esub> inv\<^bsub>H\<^esub> (h x)" .
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   636
  with x show ?thesis by simp
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   637
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   638
13949
0ce528cd6f19 HOL-Algebra complete for release Isabelle2003 (modulo section headers).
ballarin
parents: 13944
diff changeset
   639
subsection {* Commutative Structures *}
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   640
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   641
text {*
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   642
  Naming convention: multiplicative structures that are commutative
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   643
  are called \emph{commutative}, additive structures are called
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   644
  \emph{Abelian}.
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   645
*}
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   646
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   647
subsection {* Definition *}
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   648
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   649
locale comm_semigroup = semigroup +
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   650
  assumes m_comm: "[| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y = y \<otimes> x"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   651
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   652
lemma (in comm_semigroup) m_lcomm:
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   653
  "[| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   654
   x \<otimes> (y \<otimes> z) = y \<otimes> (x \<otimes> z)"
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   655
proof -
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   656
  assume xyz: "x \<in> carrier G"  "y \<in> carrier G"  "z \<in> carrier G"
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   657
  from xyz have "x \<otimes> (y \<otimes> z) = (x \<otimes> y) \<otimes> z" by (simp add: m_assoc)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   658
  also from xyz have "... = (y \<otimes> x) \<otimes> z" by (simp add: m_comm)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   659
  also from xyz have "... = y \<otimes> (x \<otimes> z)" by (simp add: m_assoc)
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   660
  finally show ?thesis .
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   661
qed
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   662
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   663
lemmas (in comm_semigroup) m_ac = m_assoc m_comm m_lcomm
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   664
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   665
locale comm_monoid = comm_semigroup + monoid
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   666
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   667
lemma comm_monoidI:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   668
  includes struct G
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   669
  assumes m_closed:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   670
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y \<in> carrier G"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   671
    and one_closed: "\<one> \<in> carrier G"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   672
    and m_assoc:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   673
      "!!x y z. [| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   674
      (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   675
    and l_one: "!!x. x \<in> carrier G ==> \<one> \<otimes> x = x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   676
    and m_comm:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   677
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y = y \<otimes> x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   678
  shows "comm_monoid G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   679
  using l_one
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   680
  by (auto intro!: comm_monoid.intro magma.intro semigroup_axioms.intro
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   681
    comm_semigroup_axioms.intro monoid_axioms.intro
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   682
    intro: prems simp: m_closed one_closed m_comm)
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   683
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   684
lemma (in monoid) monoid_comm_monoidI:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   685
  assumes m_comm:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   686
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y = y \<otimes> x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   687
  shows "comm_monoid G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   688
  by (rule comm_monoidI) (auto intro: m_assoc m_comm)
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   689
(*lemma (in comm_monoid) r_one [simp]:
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   690
  "x \<in> carrier G ==> x \<otimes> \<one> = x"
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   691
proof -
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   692
  assume G: "x \<in> carrier G"
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   693
  then have "x \<otimes> \<one> = \<one> \<otimes> x" by (simp add: m_comm)
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   694
  also from G have "... = x" by simp
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   695
  finally show ?thesis .
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   696
qed*)
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   697
lemma (in comm_monoid) nat_pow_distr:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   698
  "[| x \<in> carrier G; y \<in> carrier G |] ==>
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   699
  (x \<otimes> y) (^) (n::nat) = x (^) n \<otimes> y (^) n"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   700
  by (induct n) (simp, simp add: m_ac)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   701
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   702
locale comm_group = comm_monoid + group
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   703
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   704
lemma (in group) group_comm_groupI:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   705
  assumes m_comm: "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==>
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   706
      x \<otimes> y = y \<otimes> x"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   707
  shows "comm_group G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   708
  by (fast intro: comm_group.intro comm_semigroup_axioms.intro
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   709
    group.axioms prems)
13817
7e031a968443 Product operator added --- preliminary.
ballarin
parents: 13813
diff changeset
   710
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   711
lemma comm_groupI:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   712
  includes struct G
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   713
  assumes m_closed:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   714
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y \<in> carrier G"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   715
    and one_closed: "\<one> \<in> carrier G"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   716
    and m_assoc:
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   717
      "!!x y z. [| x \<in> carrier G; y \<in> carrier G; z \<in> carrier G |] ==>
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   718
      (x \<otimes> y) \<otimes> z = x \<otimes> (y \<otimes> z)"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   719
    and m_comm:
14693
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   720
      "!!x y. [| x \<in> carrier G; y \<in> carrier G |] ==> x \<otimes> y = y \<otimes> x"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   721
    and l_one: "!!x. x \<in> carrier G ==> \<one> \<otimes> x = x"
4deda204e1d8 improved syntax;
wenzelm
parents: 14651
diff changeset
   722
    and l_inv_ex: "!!x. x \<in> carrier G ==> EX y : carrier G. y \<otimes> x = \<one>"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   723
  shows "comm_group G"
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   724
  by (fast intro: group.group_comm_groupI groupI prems)
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   725
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   726
lemma (in comm_group) inv_mult:
13854
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   727
  "[| x \<in> carrier G; y \<in> carrier G |] ==> inv (x \<otimes> y) = inv x \<otimes> inv y"
13936
d3671b878828 Greatly extended CRing. Added Module.
ballarin
parents: 13854
diff changeset
   728
  by (simp add: m_ac inv_mult_group)
13854
91c9ab25fece First distributed version of Group and Ring theory.
ballarin
parents: 13835
diff changeset
   729
13813
722593f2f068 New development of algebra: Groups.
ballarin
parents:
diff changeset
   730
end