Theory Generated_Groups
section ‹Generated Groups›
theory Generated_Groups
imports Group Coset
begin
subsection ‹Generated Groups›
inductive_set generate :: "('a, 'b) monoid_scheme ⇒ 'a set ⇒ 'a set"
for G and H where
one: "𝟭⇘G⇙ ∈ generate G H"
| incl: "h ∈ H ⟹ h ∈ generate G H"
| inv: "h ∈ H ⟹ inv⇘G⇙ h ∈ generate G H"
| eng: "h1 ∈ generate G H ⟹ h2 ∈ generate G H ⟹ h1 ⊗⇘G⇙ h2 ∈ generate G H"
subsubsection ‹Basic Properties›
lemma (in group) generate_consistent:
assumes "K ⊆ H" "subgroup H G" shows "generate (G ⦇ carrier := H ⦈) K = generate G K"
proof
show "generate (G ⦇ carrier := H ⦈) K ⊆ generate G K"
proof
fix h assume "h ∈ generate (G ⦇ carrier := H ⦈) K" thus "h ∈ generate G K"
proof (induction, simp add: one, simp_all add: incl[of _ K G] eng)
case inv thus ?case
using m_inv_consistent assms generate.inv[of _ K G] by auto
qed
qed
next
show "generate G K ⊆ generate (G ⦇ carrier := H ⦈) K"
proof
note gen_simps = one incl eng
fix h assume "h ∈ generate G K" thus "h ∈ generate (G ⦇ carrier := H ⦈) K"
using gen_simps[where ?G = "G ⦇ carrier := H ⦈"]
proof (induction, auto)
fix h assume "h ∈ K" thus "inv h ∈ generate (G ⦇ carrier := H ⦈) K"
using m_inv_consistent assms generate.inv[of h K "G ⦇ carrier := H ⦈"] by auto
qed
qed
qed
lemma (in group) generate_in_carrier:
assumes "H ⊆ carrier G" and "h ∈ generate G H" shows "h ∈ carrier G"
using assms(2,1) by (induct h rule: generate.induct) (auto)
lemma (in group) generate_incl:
assumes "H ⊆ carrier G" shows "generate G H ⊆ carrier G"
using generate_in_carrier[OF assms(1)] by auto
lemma (in group) generate_m_inv_closed:
assumes "H ⊆ carrier G" and "h ∈ generate G H" shows "(inv h) ∈ generate G H"
using assms(2,1)
proof (induction rule: generate.induct, auto simp add: one inv incl)
fix h1 h2
assume h1: "h1 ∈ generate G H" "inv h1 ∈ generate G H"
and h2: "h2 ∈ generate G H" "inv h2 ∈ generate G H"
hence "inv (h1 ⊗ h2) = (inv h2) ⊗ (inv h1)"
by (meson assms generate_in_carrier group.inv_mult_group is_group)
thus "inv (h1 ⊗ h2) ∈ generate G H"
using generate.eng[OF h2(2) h1(2)] by simp
qed
lemma (in group) generate_is_subgroup:
assumes "H ⊆ carrier G" shows "subgroup (generate G H) G"
using subgroup.intro[OF generate_incl eng one generate_m_inv_closed] assms by auto
lemma (in group) mono_generate:
assumes "K ⊆ H" shows "generate G K ⊆ generate G H"
proof
fix h assume "h ∈ generate G K" thus "h ∈ generate G H"
using assms by (induction) (auto simp add: one incl inv eng)
qed
lemma (in group) generate_subgroup_incl:
assumes "K ⊆ H" "subgroup H G" shows "generate G K ⊆ H"
using group.generate_incl[OF subgroup_imp_group[OF assms(2)], of K] assms(1)
by (simp add: generate_consistent[OF assms])
lemma (in group) generate_minimal:
assumes "H ⊆ carrier G" shows "generate G H = ⋂ { H'. subgroup H' G ∧ H ⊆ H' }"
using generate_subgroup_incl generate_is_subgroup[OF assms] incl[of _ H] by blast
lemma (in group) generateI:
assumes "subgroup E G" "H ⊆ E" and "⋀K. ⟦ subgroup K G; H ⊆ K ⟧ ⟹ E ⊆ K"
shows "E = generate G H"
proof -
have subset: "H ⊆ carrier G"
using subgroup.subset assms by auto
show ?thesis
using assms unfolding generate_minimal[OF subset] by blast
qed
lemma (in group) normal_generateI:
assumes "H ⊆ carrier G" and "⋀h g. ⟦ h ∈ H; g ∈ carrier G ⟧ ⟹ g ⊗ h ⊗ (inv g) ∈ H"
shows "generate G H ⊲ G"
proof (rule normal_invI[OF generate_is_subgroup[OF assms(1)]])
fix g h assume g: "g ∈ carrier G" show "h ∈ generate G H ⟹ g ⊗ h ⊗ (inv g) ∈ generate G H"
proof (induct h rule: generate.induct)
case one thus ?case
using g generate.one by auto
next
case incl show ?case
using generate.incl[OF assms(2)[OF incl g]] .
next
case (inv h)
hence h: "h ∈ carrier G"
using assms(1) by auto
hence "inv (g ⊗ h ⊗ (inv g)) = g ⊗ (inv h) ⊗ (inv g)"
using g by (simp add: inv_mult_group m_assoc)
thus ?case
using generate_m_inv_closed[OF assms(1) generate.incl[OF assms(2)[OF inv g]]] by simp
next
case (eng h1 h2)
note in_carrier = eng(1,3)[THEN generate_in_carrier[OF assms(1)]]
have "g ⊗ (h1 ⊗ h2) ⊗ inv g = (g ⊗ h1 ⊗ inv g) ⊗ (g ⊗ h2 ⊗ inv g)"
using in_carrier g by (simp add: inv_solve_left m_assoc)
thus ?case
using generate.eng[OF eng(2,4)] by simp
qed
qed
lemma (in group) subgroup_int_pow_closed:
assumes "subgroup H G" "h ∈ H" shows "h [^] (k :: int) ∈ H"
using group.int_pow_closed[OF subgroup_imp_group[OF assms(1)]] assms(2)
unfolding int_pow_consistent[OF assms] by simp
lemma (in group) generate_pow:
assumes "a ∈ carrier G" shows "generate G { a } = { a [^] (k :: int) | k. k ∈ UNIV }"
proof
show "{ a [^] (k :: int) | k. k ∈ UNIV } ⊆ generate G { a }"
using subgroup_int_pow_closed[OF generate_is_subgroup[of "{ a }"] incl[of a]] assms by auto
next
show "generate G { a } ⊆ { a [^] (k :: int) | k. k ∈ UNIV }"
proof
fix h assume "h ∈ generate G { a }" hence "∃k :: int. h = a [^] k"
proof (induction)
case one
then show ?case
using int_pow_0 [of G] by metis
next
case (incl h)
then show ?case
by (metis assms int_pow_1 singletonD)
next
case (inv h)
then show ?case
by (metis assms int_pow_1 int_pow_neg singletonD)
next
case (eng h1 h2)
then show ?case
using assms by (metis int_pow_mult)
qed
then show "h ∈ { a [^] (k :: int) | k. k ∈ UNIV }"
by blast
qed
qed
corollary (in group) generate_one: "generate G { 𝟭 } = { 𝟭 }"
using generate_pow[of "𝟭", OF one_closed] by simp
corollary (in group) generate_empty: "generate G {} = { 𝟭 }"
using mono_generate[of "{}" "{ 𝟭 }"] generate.one unfolding generate_one by auto
lemma (in group_hom)
"subgroup K G ⟹ subgroup (h ` K) H"
using subgroup_img_is_subgroup by auto
lemma (in group_hom) generate_img:
assumes "K ⊆ carrier G" shows "generate H (h ` K) = h ` (generate G K)"
proof
have "h ` K ⊆ h ` (generate G K)"
using incl[of _ K G] by auto
thus "generate H (h ` K) ⊆ h ` (generate G K)"
using generate_subgroup_incl subgroup_img_is_subgroup[OF G.generate_is_subgroup[OF assms]] by auto
next
show "h ` (generate G K) ⊆ generate H (h ` K)"
proof
fix a assume "a ∈ h ` (generate G K)"
then obtain k where "k ∈ generate G K" "a = h k"
by blast
show "a ∈ generate H (h ` K)"
using ‹k ∈ generate G K› unfolding ‹a = h k›
proof (induct k, auto simp add: generate.one[of H] generate.incl[of _ "h ` K" H])
case (inv k) show ?case
using assms generate.inv[of "h k" "h ` K" H] inv by auto
next
case eng show ?case
using generate.eng[OF eng(2,4)] eng(1,3)[THEN G.generate_in_carrier[OF assms]] by auto
qed
qed
qed
subsection ‹Derived Subgroup›
subsubsection ‹Definitions›
abbreviation derived_set :: "('a, 'b) monoid_scheme ⇒ 'a set ⇒ 'a set"
where "derived_set G H ≡
⋃h1 ∈ H. (⋃h2 ∈ H. { h1 ⊗⇘G⇙ h2 ⊗⇘G⇙ (inv⇘G⇙ h1) ⊗⇘G⇙ (inv⇘G⇙ h2) })"
definition derived :: "('a, 'b) monoid_scheme ⇒ 'a set ⇒ 'a set" where
"derived G H = generate G (derived_set G H)"
subsubsection ‹Basic Properties›
lemma (in group) derived_set_incl:
assumes "K ⊆ H" "subgroup H G" shows "derived_set G K ⊆ H"
using assms(1) subgroupE(3-4)[OF assms(2)] by (auto simp add: subset_iff)
lemma (in group) derived_incl:
assumes "K ⊆ H" "subgroup H G" shows "derived G K ⊆ H"
using generate_subgroup_incl[OF derived_set_incl] assms unfolding derived_def by auto
lemma (in group) derived_set_in_carrier:
assumes "H ⊆ carrier G" shows "derived_set G H ⊆ carrier G"
using derived_set_incl[OF assms subgroup_self] .
lemma (in group) derived_in_carrier:
assumes "H ⊆ carrier G" shows "derived G H ⊆ carrier G"
using derived_incl[OF assms subgroup_self] .
lemma (in group) exp_of_derived_in_carrier:
assumes "H ⊆ carrier G" shows "(derived G ^^ n) H ⊆ carrier G"
using assms derived_in_carrier by (induct n) (auto)
lemma (in group) derived_is_subgroup:
assumes "H ⊆ carrier G" shows "subgroup (derived G H) G"
unfolding derived_def using generate_is_subgroup[OF derived_set_in_carrier[OF assms]] .
lemma (in group) exp_of_derived_is_subgroup:
assumes "subgroup H G" shows "subgroup ((derived G ^^ n) H) G"
using assms derived_is_subgroup subgroup.subset by (induct n) (auto)
lemma (in group) exp_of_derived_is_subgroup':
assumes "H ⊆ carrier G" shows "subgroup ((derived G ^^ (Suc n)) H) G"
using assms derived_is_subgroup[OF subgroup.subset] derived_is_subgroup by (induct n) (auto)
lemma (in group) mono_derived_set:
assumes "K ⊆ H" shows "derived_set G K ⊆ derived_set G H"
using assms by auto
lemma (in group) mono_derived:
assumes "K ⊆ H" shows "derived G K ⊆ derived G H"
unfolding derived_def using mono_generate[OF mono_derived_set[OF assms]] .
lemma (in group) mono_exp_of_derived:
assumes "K ⊆ H" shows "(derived G ^^ n) K ⊆ (derived G ^^ n) H"
using assms mono_derived by (induct n) (auto)
lemma (in group) derived_set_consistent:
assumes "K ⊆ H" "subgroup H G" shows "derived_set (G ⦇ carrier := H ⦈) K = derived_set G K"
using m_inv_consistent[OF assms(2)] assms(1) by (auto simp add: subset_iff)
lemma (in group) derived_consistent:
assumes "K ⊆ H" "subgroup H G" shows "derived (G ⦇ carrier := H ⦈) K = derived G K"
using generate_consistent[OF derived_set_incl] derived_set_consistent assms by (simp add: derived_def)
lemma (in comm_group) derived_eq_singleton:
assumes "H ⊆ carrier G" shows "derived G H = { 𝟭 }"
proof (cases "derived_set G H = {}")
case True show ?thesis
using generate_empty unfolding derived_def True by simp
next
case False
have aux_lemma: "h ∈ derived_set G H ⟹ h = 𝟭" for h
using assms by (auto simp add: subset_iff)
(metis (no_types, lifting) m_comm m_closed inv_closed inv_solve_right l_inv l_inv_ex)
have "derived_set G H = { 𝟭 }"
proof
show "derived_set G H ⊆ { 𝟭 }"
using aux_lemma by auto
next
obtain h where h: "h ∈ derived_set G H"
using False by blast
thus "{ 𝟭 } ⊆ derived_set G H"
using aux_lemma[OF h] by auto
qed
thus ?thesis
using generate_one unfolding derived_def by auto
qed
lemma (in group) derived_is_normal:
assumes "H ⊲ G" shows "derived G H ⊲ G"
proof -
interpret H: normal H G
using assms .
show ?thesis
unfolding derived_def
proof (rule normal_generateI[OF derived_set_in_carrier[OF H.subset]])
fix h g assume "h ∈ derived_set G H" and g: "g ∈ carrier G"
then obtain h1 h2 where h: "h1 ∈ H" "h2 ∈ H" "h = h1 ⊗ h2 ⊗ inv h1 ⊗ inv h2"
by auto
hence in_carrier: "h1 ∈ carrier G" "h2 ∈ carrier G" "g ∈ carrier G"
using H.subset g by auto
have "g ⊗ h ⊗ inv g =
g ⊗ h1 ⊗ (inv g ⊗ g) ⊗ h2 ⊗ (inv g ⊗ g) ⊗ inv h1 ⊗ (inv g ⊗ g) ⊗ inv h2 ⊗ inv g"
unfolding h(3) by (simp add: in_carrier m_assoc)
also have " ... =
(g ⊗ h1 ⊗ inv g) ⊗ (g ⊗ h2 ⊗ inv g) ⊗ (g ⊗ inv h1 ⊗ inv g) ⊗ (g ⊗ inv h2 ⊗ inv g)"
using in_carrier m_assoc inv_closed m_closed by presburger
finally have "g ⊗ h ⊗ inv g =
(g ⊗ h1 ⊗ inv g) ⊗ (g ⊗ h2 ⊗ inv g) ⊗ inv (g ⊗ h1 ⊗ inv g) ⊗ inv (g ⊗ h2 ⊗ inv g)"
by (simp add: in_carrier inv_mult_group m_assoc)
thus "g ⊗ h ⊗ inv g ∈ derived_set G H"
using h(1-2)[THEN H.inv_op_closed2[OF g]] by auto
qed
qed
lemma (in group) normal_self: "carrier G ⊲ G"
by (rule normal_invI[OF subgroup_self], simp)
corollary (in group) derived_self_is_normal: "derived G (carrier G) ⊲ G"
using derived_is_normal[OF normal_self] .
corollary (in group) derived_subgroup_is_normal:
assumes "subgroup H G" shows "derived G H ⊲ G ⦇ carrier := H ⦈"
using group.derived_self_is_normal[OF subgroup_imp_group[OF assms]]
derived_consistent[OF _ assms]
by simp
corollary (in group) derived_quot_is_group: "group (G Mod (derived G (carrier G)))"
using normal.factorgroup_is_group[OF derived_self_is_normal] by auto
lemma (in group) derived_quot_is_comm_group: "comm_group (G Mod (derived G (carrier G)))"
proof (rule group.group_comm_groupI[OF derived_quot_is_group], simp add: FactGroup_def)
interpret DG: normal "derived G (carrier G)" G
using derived_self_is_normal .
fix H K assume "H ∈ rcosets derived G (carrier G)" and "K ∈ rcosets derived G (carrier G)"
then obtain g1 g2
where g1: "g1 ∈ carrier G" "H = derived G (carrier G) #> g1"
and g2: "g2 ∈ carrier G" "K = derived G (carrier G) #> g2"
unfolding RCOSETS_def by auto
hence "H <#> K = derived G (carrier G) #> (g1 ⊗ g2)"
by (simp add: DG.rcos_sum)
also have " ... = derived G (carrier G) #> (g2 ⊗ g1)"
proof -
have "derived G (carrier G) #> (g1 ⊗ g2) ⊆ derived G (carrier G) #> (g2 ⊗ g1)"
if g1: "g1 ∈ carrier G" and g2: "g2 ∈ carrier G" for g1 g2
proof
fix h assume "h ∈ derived G (carrier G) #> (g1 ⊗ g2)"
then obtain g' where h: "g' ∈ carrier G" "g' ∈ derived G (carrier G)" "h = g' ⊗ (g1 ⊗ g2)"
using DG.subset unfolding r_coset_def by auto
hence "h = g' ⊗ (g1 ⊗ g2) ⊗ (inv g1 ⊗ inv g2 ⊗ g2 ⊗ g1)"
using g1 g2 by (simp add: m_assoc)
hence "h = (g' ⊗ (g1 ⊗ g2 ⊗ inv g1 ⊗ inv g2)) ⊗ (g2 ⊗ g1)"
using h(1) g1 g2 inv_closed m_assoc m_closed by presburger
moreover have "g1 ⊗ g2 ⊗ inv g1 ⊗ inv g2 ∈ derived G (carrier G)"
using incl[of _ "derived_set G (carrier G)"] g1 g2 unfolding derived_def by blast
hence "g' ⊗ (g1 ⊗ g2 ⊗ inv g1 ⊗ inv g2) ∈ derived G (carrier G)"
using DG.m_closed[OF h(2)] by simp
ultimately show "h ∈ derived G (carrier G) #> (g2 ⊗ g1)"
unfolding r_coset_def by blast
qed
thus ?thesis
using g1(1) g2(1) by auto
qed
also have " ... = K <#> H"
by (simp add: g1 g2 DG.rcos_sum)
finally show "H <#> K = K <#> H" .
qed
corollary (in group) derived_quot_of_subgroup_is_comm_group:
assumes "subgroup H G" shows "comm_group ((G ⦇ carrier := H ⦈) Mod (derived G H))"
using group.derived_quot_is_comm_group[OF subgroup_imp_group[OF assms]]
derived_consistent[OF _ assms]
by simp
proposition (in group) derived_minimal:
assumes "H ⊲ G" and "comm_group (G Mod H)" shows "derived G (carrier G) ⊆ H"
proof -
interpret H: normal H G
using assms(1) .
show ?thesis
unfolding derived_def
proof (rule generate_subgroup_incl[OF _ H.subgroup_axioms])
show "derived_set G (carrier G) ⊆ H"
proof
fix h assume "h ∈ derived_set G (carrier G)"
then obtain g1 g2 where h: "g1 ∈ carrier G" "g2 ∈ carrier G" "h = g1 ⊗ g2 ⊗ inv g1 ⊗ inv g2"
by auto
have "H #> (g1 ⊗ g2) = (H #> g1) <#> (H #> g2)"
by (simp add: h(1-2) H.rcos_sum)
also have " ... = (H #> g2) <#> (H #> g1)"
using comm_groupE(4)[OF assms(2)] h(1-2) unfolding FactGroup_def RCOSETS_def by auto
also have " ... = H #> (g2 ⊗ g1)"
by (simp add: h(1-2) H.rcos_sum)
finally have "H #> (g1 ⊗ g2) = H #> (g2 ⊗ g1)" .
then obtain h' where "h' ∈ H" "𝟭 ⊗ (g1 ⊗ g2) = h' ⊗ (g2 ⊗ g1)"
using H.one_closed unfolding r_coset_def by blast
thus "h ∈ H"
using h m_assoc by auto
qed
qed
qed
proposition (in group) derived_of_subgroup_minimal:
assumes "K ⊲ G ⦇ carrier := H ⦈" "subgroup H G" and "comm_group ((G ⦇ carrier := H ⦈) Mod K)"
shows "derived G H ⊆ K"
using group.derived_minimal[OF subgroup_imp_group[OF assms(2)] assms(1,3)]
derived_consistent[OF _ assms(2)]
by simp
lemma (in group_hom) derived_img:
assumes "K ⊆ carrier G" shows "derived H (h ` K) = h ` (derived G K)"
proof -
have "derived_set H (h ` K) = h ` (derived_set G K)"
proof
show "derived_set H (h ` K) ⊆ h ` derived_set G K"
proof
fix a assume "a ∈ derived_set H (h ` K)"
then obtain k1 k2
where "k1 ∈ K" "k2 ∈ K" "a = (h k1) ⊗⇘H⇙ (h k2) ⊗⇘H⇙ inv⇘H⇙ (h k1) ⊗⇘H⇙ inv⇘H⇙ (h k2)"
by auto
hence "a = h (k1 ⊗ k2 ⊗ inv k1 ⊗ inv k2)"
using assms by (simp add: subset_iff)
from this ‹k1 ∈ K› and ‹k2 ∈ K› show "a ∈ h ` derived_set G K" by auto
qed
next
show "h ` (derived_set G K) ⊆ derived_set H (h ` K)"
proof
fix a assume "a ∈ h ` (derived_set G K)"
then obtain k1 k2 where "k1 ∈ K" "k2 ∈ K" "a = h (k1 ⊗ k2 ⊗ inv k1 ⊗ inv k2)"
by auto
hence "a = (h k1) ⊗⇘H⇙ (h k2) ⊗⇘H⇙ inv⇘H⇙ (h k1) ⊗⇘H⇙ inv⇘H⇙ (h k2)"
using assms by (simp add: subset_iff)
from this ‹k1 ∈ K› and ‹k2 ∈ K› show "a ∈ derived_set H (h ` K)" by auto
qed
qed
thus ?thesis
unfolding derived_def using generate_img[OF G.derived_set_in_carrier[OF assms]] by simp
qed
lemma (in group_hom) exp_of_derived_img:
assumes "K ⊆ carrier G" shows "(derived H ^^ n) (h ` K) = h ` ((derived G ^^ n) K)"
using derived_img[OF G.exp_of_derived_in_carrier[OF assms]] by (induct n) (auto)
subsubsection ‹Generated subgroup of a group›
definition subgroup_generated :: "('a, 'b) monoid_scheme ⇒ 'a set ⇒ ('a, 'b) monoid_scheme"
where "subgroup_generated G S = G⦇carrier := generate G (carrier G ∩ S)⦈"
lemma carrier_subgroup_generated: "carrier (subgroup_generated G S) = generate G (carrier G ∩ S)"
by (auto simp: subgroup_generated_def)
lemma (in group) subgroup_generated_subset_carrier_subset:
"S ⊆ carrier G ⟹ S ⊆ carrier(subgroup_generated G S)"
by (simp add: Int_absorb1 carrier_subgroup_generated generate.incl subsetI)
lemma (in group) subgroup_generated_minimal:
"⟦subgroup H G; S ⊆ H⟧ ⟹ carrier(subgroup_generated G S) ⊆ H"
by (simp add: carrier_subgroup_generated generate_subgroup_incl le_infI2)
lemma (in group) carrier_subgroup_generated_subset:
"carrier (subgroup_generated G A) ⊆ carrier G"
apply (clarsimp simp: carrier_subgroup_generated)
by (meson Int_lower1 generate_in_carrier)
lemma (in group) group_subgroup_generated [simp]: "group (subgroup_generated G S)"
unfolding subgroup_generated_def
by (simp add: generate_is_subgroup subgroup_imp_group)
lemma (in group) abelian_subgroup_generated:
assumes "comm_group G"
shows "comm_group (subgroup_generated G S)" (is "comm_group ?GS")
proof (rule group.group_comm_groupI)
show "Group.group ?GS"
by simp
next
fix x y
assume "x ∈ carrier ?GS" "y ∈ carrier ?GS"
with assms show "x ⊗⇘?GS⇙ y = y ⊗⇘?GS⇙ x"
apply (simp add: subgroup_generated_def)
by (meson Int_lower1 comm_groupE(4) generate_in_carrier)
qed
lemma (in group) subgroup_of_subgroup_generated:
assumes "H ⊆ B" "subgroup H G"
shows "subgroup H (subgroup_generated G B)"
proof unfold_locales
fix x
assume "x ∈ H"
with assms show "inv⇘subgroup_generated G B⇙ x ∈ H"
unfolding subgroup_generated_def
by (metis IntI Int_commute Int_lower2 generate.incl generate_is_subgroup m_inv_consistent subgroup_def subsetCE)
next
show "H ⊆ carrier (subgroup_generated G B)"
using assms apply (auto simp: carrier_subgroup_generated)
by (metis Int_iff generate.incl inf.orderE subgroup.mem_carrier)
qed (use assms in ‹auto simp: subgroup_generated_def subgroup_def›)
lemma carrier_subgroup_generated_alt:
assumes "Group.group G" "S ⊆ carrier G"
shows "carrier (subgroup_generated G S) = ⋂{H. subgroup H G ∧ carrier G ∩ S ⊆ H}"
using assms by (auto simp: group.generate_minimal subgroup_generated_def)
lemma one_subgroup_generated [simp]: "𝟭⇘subgroup_generated G S⇙ = 𝟭⇘G⇙"
by (auto simp: subgroup_generated_def)
lemma mult_subgroup_generated [simp]: "mult (subgroup_generated G S) = mult G"
by (auto simp: subgroup_generated_def)
lemma (in group) inv_subgroup_generated [simp]:
assumes "f ∈ carrier (subgroup_generated G S)"
shows "inv⇘subgroup_generated G S⇙ f = inv f"
proof (rule group.inv_equality)
show "Group.group (subgroup_generated G S)"
by simp
have [simp]: "f ∈ carrier G"
by (metis Int_lower1 assms carrier_subgroup_generated generate_in_carrier)
show "inv f ⊗⇘subgroup_generated G S⇙ f = 𝟭⇘subgroup_generated G S⇙"
by (simp add: assms)
show "f ∈ carrier (subgroup_generated G S)"
using assms by (simp add: generate.incl subgroup_generated_def)
show "inv f ∈ carrier (subgroup_generated G S)"
using assms by (simp add: subgroup_generated_def generate_m_inv_closed)
qed
lemma subgroup_generated_restrict [simp]:
"subgroup_generated G (carrier G ∩ S) = subgroup_generated G S"
by (simp add: subgroup_generated_def)
lemma (in subgroup) carrier_subgroup_generated_subgroup [simp]:
"carrier (subgroup_generated G H) = H"
by (auto simp: generate.incl carrier_subgroup_generated elim: generate.induct)
lemma (in group) subgroup_subgroup_generated_iff:
"subgroup H (subgroup_generated G B) ⟷ subgroup H G ∧ H ⊆ carrier(subgroup_generated G B)"
(is "?lhs = ?rhs")
proof
assume L: ?lhs
then have Hsub: "H ⊆ generate G (carrier G ∩ B)"
by (simp add: subgroup_def subgroup_generated_def)
then have H: "H ⊆ carrier G" "H ⊆ carrier(subgroup_generated G B)"
unfolding carrier_subgroup_generated
using generate_incl by blast+
with Hsub have "subgroup H G"
by (metis Int_commute Int_lower2 L carrier_subgroup_generated generate_consistent
generate_is_subgroup inf.orderE subgroup.carrier_subgroup_generated_subgroup subgroup_generated_def)
with H show ?rhs
by blast
next
assume ?rhs
then show ?lhs
by (simp add: generate_is_subgroup subgroup_generated_def subgroup_incl)
qed
lemma (in group) subgroup_subgroup_generated:
"subgroup (carrier(subgroup_generated G S)) G"
using group.subgroup_self group_subgroup_generated subgroup_subgroup_generated_iff by blast
lemma pow_subgroup_generated:
"pow (subgroup_generated G S) = (pow G :: 'a ⇒ nat ⇒ 'a)"
proof -
have "x [^]⇘subgroup_generated G S⇙ n = x [^]⇘G⇙ n" for x and n::nat
by (induction n) auto
then show ?thesis
by force
qed
lemma (in group) subgroup_generated2 [simp]: "subgroup_generated (subgroup_generated G S) S = subgroup_generated G S"
proof -
have *: "⋀A. carrier G ∩ A ⊆ carrier (subgroup_generated (subgroup_generated G A) A)"
by (metis (no_types, opaque_lifting) Int_assoc carrier_subgroup_generated generate.incl inf.order_iff subset_iff)
show ?thesis
apply (auto intro!: monoid.equality)
using group.carrier_subgroup_generated_subset group_subgroup_generated apply blast
apply (metis (no_types, opaque_lifting) "*" group.subgroup_subgroup_generated group_subgroup_generated subgroup_generated_minimal
subgroup_generated_restrict subgroup_subgroup_generated_iff subset_eq)
apply (simp add: subgroup_generated_def)
done
qed
lemma (in group) int_pow_subgroup_generated:
fixes n::int
assumes "x ∈ carrier (subgroup_generated G S)"
shows "x [^]⇘subgroup_generated G S⇙ n = x [^]⇘G⇙ n"
proof -
have "x [^] nat (- n) ∈ carrier (subgroup_generated G S)"
by (metis assms group.is_monoid group_subgroup_generated monoid.nat_pow_closed pow_subgroup_generated)
then show ?thesis
by (metis group.inv_subgroup_generated int_pow_def2 is_group pow_subgroup_generated)
qed
lemma kernel_from_subgroup_generated [simp]:
"subgroup S G ⟹ kernel (subgroup_generated G S) H f = kernel G H f ∩ S"
using subgroup.carrier_subgroup_generated_subgroup subgroup.subset
by (fastforce simp add: kernel_def set_eq_iff)
lemma kernel_to_subgroup_generated [simp]:
"kernel G (subgroup_generated H S) f = kernel G H f"
by (simp add: kernel_def)
subsection ‹And homomorphisms›
lemma (in group) hom_from_subgroup_generated:
"h ∈ hom G H ⟹ h ∈ hom(subgroup_generated G A) H"
apply (simp add: hom_def carrier_subgroup_generated Pi_iff)
apply (metis group.generate_in_carrier inf_le1 is_group)
done
lemma hom_into_subgroup:
"⟦h ∈ hom G G'; h ` (carrier G) ⊆ H⟧ ⟹ h ∈ hom G (subgroup_generated G' H)"
by (auto simp: hom_def carrier_subgroup_generated Pi_iff generate.incl image_subset_iff)
lemma hom_into_subgroup_eq_gen:
"group G ⟹
h ∈ hom K (subgroup_generated G H)
⟷ h ∈ hom K G ∧ h ` (carrier K) ⊆ carrier(subgroup_generated G H)"
using group.carrier_subgroup_generated_subset [of G H] by (auto simp: hom_def)
lemma hom_into_subgroup_eq:
"⟦subgroup H G; group G⟧
⟹ (h ∈ hom K (subgroup_generated G H) ⟷ h ∈ hom K G ∧ h ` (carrier K) ⊆ H)"
by (simp add: hom_into_subgroup_eq_gen image_subset_iff subgroup.carrier_subgroup_generated_subgroup)
lemma (in group_hom) hom_between_subgroups:
assumes "h ` A ⊆ B"
shows "h ∈ hom (subgroup_generated G A) (subgroup_generated H B)"
proof -
have [simp]: "group G" "group H"
by (simp_all add: G.is_group H.is_group)
have "x ∈ generate G (carrier G ∩ A) ⟹ h x ∈ generate H (carrier H ∩ B)" for x
proof (induction x rule: generate.induct)
case (incl h)
then show ?case
by (meson IntE IntI assms generate.incl hom_closed image_subset_iff)
next
case (inv h)
then show ?case
by (metis G.inv_closed G.inv_inv IntE IntI assms generate.simps hom_inv image_subset_iff local.inv_closed)
next
case (eng h1 h2)
then show ?case
by (metis G.generate_in_carrier generate.simps inf.cobounded1 local.hom_mult)
qed (auto simp: generate.intros)
then have "h ` carrier (subgroup_generated G A) ⊆ carrier (subgroup_generated H B)"
using group.carrier_subgroup_generated_subset [of G A]
by (auto simp: carrier_subgroup_generated)
then show ?thesis
by (simp add: hom_into_subgroup_eq_gen group.hom_from_subgroup_generated homh)
qed
lemma (in group_hom) subgroup_generated_by_image:
assumes "S ⊆ carrier G"
shows "carrier (subgroup_generated H (h ` S)) = h ` (carrier(subgroup_generated G S))"
proof
have "x ∈ generate H (carrier H ∩ h ` S) ⟹ x ∈ h ` generate G (carrier G ∩ S)" for x
proof (erule generate.induct)
show "𝟭⇘H⇙ ∈ h ` generate G (carrier G ∩ S)"
using generate.one by force
next
fix f
assume "f ∈ carrier H ∩ h ` S"
with assms show "f ∈ h ` generate G (carrier G ∩ S)" "inv⇘H⇙ f ∈ h ` generate G (carrier G ∩ S)"
apply (auto simp: Int_absorb1 generate.incl)
apply (metis generate.simps hom_inv imageI subsetCE)
done
next
fix h1 h2
assume
"h1 ∈ generate H (carrier H ∩ h ` S)" "h1 ∈ h ` generate G (carrier G ∩ S)"
"h2 ∈ generate H (carrier H ∩ h ` S)" "h2 ∈ h ` generate G (carrier G ∩ S)"
then show "h1 ⊗⇘H⇙ h2 ∈ h ` generate G (carrier G ∩ S)"
using H.subgroupE(4) group.generate_is_subgroup subgroup_img_is_subgroup
by (simp add: G.generate_is_subgroup)
qed
then
show "carrier (subgroup_generated H (h ` S)) ⊆ h ` carrier (subgroup_generated G S)"
by (auto simp: carrier_subgroup_generated)
next
have "h ` S ⊆ carrier H"
by (metis (no_types) assms hom_closed image_subset_iff subsetCE)
then show "h ` carrier (subgroup_generated G S) ⊆ carrier (subgroup_generated H (h ` S))"
apply (clarsimp simp: carrier_subgroup_generated)
by (metis Int_absorb1 assms generate_img imageI)
qed
lemma (in group_hom) iso_between_subgroups:
assumes "h ∈ iso G H" "S ⊆ carrier G" "h ` S = T"
shows "h ∈ iso (subgroup_generated G S) (subgroup_generated H T)"
using assms
by (metis G.carrier_subgroup_generated_subset Group.iso_iff hom_between_subgroups inj_on_subset subgroup_generated_by_image subsetI)
lemma (in group) subgroup_generated_group_carrier:
"subgroup_generated G (carrier G) = G"
proof (rule monoid.equality)
show "carrier (subgroup_generated G (carrier G)) = carrier G"
by (simp add: subgroup.carrier_subgroup_generated_subgroup subgroup_self)
qed (auto simp: subgroup_generated_def)
lemma iso_onto_image:
assumes "group G" "group H"
shows
"f ∈ iso G (subgroup_generated H (f ` carrier G)) ⟷ f ∈ hom G H ∧ inj_on f (carrier G)"
using assms
apply (auto simp: iso_def bij_betw_def hom_into_subgroup_eq_gen carrier_subgroup_generated hom_carrier generate.incl Int_absorb1 Int_absorb2)
by (metis group.generateI group.subgroupE(1) group.subgroup_self group_hom.generate_img group_hom.intro group_hom_axioms.intro)
lemma (in group) iso_onto_image:
"group H ⟹ f ∈ iso G (subgroup_generated H (f ` carrier G)) ⟷ f ∈ mon G H"
by (simp add: mon_def epi_def hom_into_subgroup_eq_gen iso_onto_image)
end