(* Title: HOL/Algebra/Divisibility.thy
Author: Clemens Ballarin
Author: Stephan Hohe
*)
section \<open>Divisibility in monoids and rings\<close>
theory Divisibility
imports "HOL-Library.Permutation" Coset Group
begin
section \<open>Factorial Monoids\<close>
subsection \<open>Monoids with Cancellation Law\<close>
locale monoid_cancel = monoid +
assumes l_cancel: "\<lbrakk>c \<otimes> a = c \<otimes> b; a \<in> carrier G; b \<in> carrier G; c \<in> carrier G\<rbrakk> \<Longrightarrow> a = b"
and r_cancel: "\<lbrakk>a \<otimes> c = b \<otimes> c; a \<in> carrier G; b \<in> carrier G; c \<in> carrier G\<rbrakk> \<Longrightarrow> a = b"
lemma (in monoid) monoid_cancelI:
assumes l_cancel: "\<And>a b c. \<lbrakk>c \<otimes> a = c \<otimes> b; a \<in> carrier G; b \<in> carrier G; c \<in> carrier G\<rbrakk> \<Longrightarrow> a = b"
and r_cancel: "\<And>a b c. \<lbrakk>a \<otimes> c = b \<otimes> c; a \<in> carrier G; b \<in> carrier G; c \<in> carrier G\<rbrakk> \<Longrightarrow> a = b"
shows "monoid_cancel G"
by standard fact+
lemma (in monoid_cancel) is_monoid_cancel: "monoid_cancel G" ..
sublocale group \<subseteq> monoid_cancel
by standard simp_all
locale comm_monoid_cancel = monoid_cancel + comm_monoid
lemma comm_monoid_cancelI:
fixes G (structure)
assumes "comm_monoid G"
assumes cancel: "\<And>a b c. \<lbrakk>a \<otimes> c = b \<otimes> c; a \<in> carrier G; b \<in> carrier G; c \<in> carrier G\<rbrakk> \<Longrightarrow> a = b"
shows "comm_monoid_cancel G"
proof -
interpret comm_monoid G by fact
show "comm_monoid_cancel G"
by unfold_locales (metis assms(2) m_ac(2))+
qed
lemma (in comm_monoid_cancel) is_comm_monoid_cancel: "comm_monoid_cancel G"
by intro_locales
sublocale comm_group \<subseteq> comm_monoid_cancel ..
subsection \<open>Products of Units in Monoids\<close>
lemma (in monoid) prod_unit_l:
assumes abunit[simp]: "a \<otimes> b \<in> Units G"
and aunit[simp]: "a \<in> Units G"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "b \<in> Units G"
proof -
have c: "inv (a \<otimes> b) \<otimes> a \<in> carrier G" by simp
have "(inv (a \<otimes> b) \<otimes> a) \<otimes> b = inv (a \<otimes> b) \<otimes> (a \<otimes> b)"
by (simp add: m_assoc)
also have "\<dots> = \<one>" by simp
finally have li: "(inv (a \<otimes> b) \<otimes> a) \<otimes> b = \<one>" .
have "\<one> = inv a \<otimes> a" by (simp add: Units_l_inv[symmetric])
also have "\<dots> = inv a \<otimes> \<one> \<otimes> a" by simp
also have "\<dots> = inv a \<otimes> ((a \<otimes> b) \<otimes> inv (a \<otimes> b)) \<otimes> a"
by (simp add: Units_r_inv[OF abunit, symmetric] del: Units_r_inv)
also have "\<dots> = ((inv a \<otimes> a) \<otimes> b) \<otimes> inv (a \<otimes> b) \<otimes> a"
by (simp add: m_assoc del: Units_l_inv)
also have "\<dots> = b \<otimes> inv (a \<otimes> b) \<otimes> a" by simp
also have "\<dots> = b \<otimes> (inv (a \<otimes> b) \<otimes> a)" by (simp add: m_assoc)
finally have ri: "b \<otimes> (inv (a \<otimes> b) \<otimes> a) = \<one> " by simp
from c li ri show "b \<in> Units G" by (auto simp: Units_def)
qed
lemma (in monoid) prod_unit_r:
assumes abunit[simp]: "a \<otimes> b \<in> Units G"
and bunit[simp]: "b \<in> Units G"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "a \<in> Units G"
proof -
have c: "b \<otimes> inv (a \<otimes> b) \<in> carrier G" by simp
have "a \<otimes> (b \<otimes> inv (a \<otimes> b)) = (a \<otimes> b) \<otimes> inv (a \<otimes> b)"
by (simp add: m_assoc del: Units_r_inv)
also have "\<dots> = \<one>" by simp
finally have li: "a \<otimes> (b \<otimes> inv (a \<otimes> b)) = \<one>" .
have "\<one> = b \<otimes> inv b" by (simp add: Units_r_inv[symmetric])
also have "\<dots> = b \<otimes> \<one> \<otimes> inv b" by simp
also have "\<dots> = b \<otimes> (inv (a \<otimes> b) \<otimes> (a \<otimes> b)) \<otimes> inv b"
by (simp add: Units_l_inv[OF abunit, symmetric] del: Units_l_inv)
also have "\<dots> = (b \<otimes> inv (a \<otimes> b) \<otimes> a) \<otimes> (b \<otimes> inv b)"
by (simp add: m_assoc del: Units_l_inv)
also have "\<dots> = b \<otimes> inv (a \<otimes> b) \<otimes> a" by simp
finally have ri: "(b \<otimes> inv (a \<otimes> b)) \<otimes> a = \<one> " by simp
from c li ri show "a \<in> Units G" by (auto simp: Units_def)
qed
lemma (in comm_monoid) unit_factor:
assumes abunit: "a \<otimes> b \<in> Units G"
and [simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "a \<in> Units G"
using abunit[simplified Units_def]
proof clarsimp
fix i
assume [simp]: "i \<in> carrier G"
have carr': "b \<otimes> i \<in> carrier G" by simp
have "(b \<otimes> i) \<otimes> a = (i \<otimes> b) \<otimes> a" by (simp add: m_comm)
also have "\<dots> = i \<otimes> (b \<otimes> a)" by (simp add: m_assoc)
also have "\<dots> = i \<otimes> (a \<otimes> b)" by (simp add: m_comm)
also assume "i \<otimes> (a \<otimes> b) = \<one>"
finally have li': "(b \<otimes> i) \<otimes> a = \<one>" .
have "a \<otimes> (b \<otimes> i) = a \<otimes> b \<otimes> i" by (simp add: m_assoc)
also assume "a \<otimes> b \<otimes> i = \<one>"
finally have ri': "a \<otimes> (b \<otimes> i) = \<one>" .
from carr' li' ri'
show "a \<in> Units G" by (simp add: Units_def, fast)
qed
subsection \<open>Divisibility and Association\<close>
subsubsection \<open>Function definitions\<close>
definition factor :: "[_, 'a, 'a] \<Rightarrow> bool" (infix "divides\<index>" 65)
where "a divides\<^bsub>G\<^esub> b \<longleftrightarrow> (\<exists>c\<in>carrier G. b = a \<otimes>\<^bsub>G\<^esub> c)"
definition associated :: "[_, 'a, 'a] \<Rightarrow> bool" (infix "\<sim>\<index>" 55)
where "a \<sim>\<^bsub>G\<^esub> b \<longleftrightarrow> a divides\<^bsub>G\<^esub> b \<and> b divides\<^bsub>G\<^esub> a"
abbreviation "division_rel G \<equiv> \<lparr>carrier = carrier G, eq = (\<sim>\<^bsub>G\<^esub>), le = (divides\<^bsub>G\<^esub>)\<rparr>"
definition properfactor :: "[_, 'a, 'a] \<Rightarrow> bool"
where "properfactor G a b \<longleftrightarrow> a divides\<^bsub>G\<^esub> b \<and> \<not>(b divides\<^bsub>G\<^esub> a)"
definition irreducible :: "[_, 'a] \<Rightarrow> bool"
where "irreducible G a \<longleftrightarrow> a \<notin> Units G \<and> (\<forall>b\<in>carrier G. properfactor G b a \<longrightarrow> b \<in> Units G)"
definition prime :: "[_, 'a] \<Rightarrow> bool"
where "prime G p \<longleftrightarrow>
p \<notin> Units G \<and>
(\<forall>a\<in>carrier G. \<forall>b\<in>carrier G. p divides\<^bsub>G\<^esub> (a \<otimes>\<^bsub>G\<^esub> b) \<longrightarrow> p divides\<^bsub>G\<^esub> a \<or> p divides\<^bsub>G\<^esub> b)"
subsubsection \<open>Divisibility\<close>
lemma dividesI:
fixes G (structure)
assumes carr: "c \<in> carrier G"
and p: "b = a \<otimes> c"
shows "a divides b"
unfolding factor_def using assms by fast
lemma dividesI' [intro]:
fixes G (structure)
assumes p: "b = a \<otimes> c"
and carr: "c \<in> carrier G"
shows "a divides b"
using assms by (fast intro: dividesI)
lemma dividesD:
fixes G (structure)
assumes "a divides b"
shows "\<exists>c\<in>carrier G. b = a \<otimes> c"
using assms unfolding factor_def by fast
lemma dividesE [elim]:
fixes G (structure)
assumes d: "a divides b"
and elim: "\<And>c. \<lbrakk>b = a \<otimes> c; c \<in> carrier G\<rbrakk> \<Longrightarrow> P"
shows "P"
proof -
from dividesD[OF d] obtain c where "c \<in> carrier G" and "b = a \<otimes> c" by auto
then show P by (elim elim)
qed
lemma (in monoid) divides_refl[simp, intro!]:
assumes carr: "a \<in> carrier G"
shows "a divides a"
by (intro dividesI[of "\<one>"]) (simp_all add: carr)
lemma (in monoid) divides_trans [trans]:
assumes dvds: "a divides b" "b divides c"
and acarr: "a \<in> carrier G"
shows "a divides c"
using dvds[THEN dividesD] by (blast intro: dividesI m_assoc acarr)
lemma (in monoid) divides_mult_lI [intro]:
assumes "a divides b" "a \<in> carrier G" "c \<in> carrier G"
shows "(c \<otimes> a) divides (c \<otimes> b)"
by (metis assms factor_def m_assoc)
lemma (in monoid_cancel) divides_mult_l [simp]:
assumes carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "(c \<otimes> a) divides (c \<otimes> b) = a divides b"
proof
show "c \<otimes> a divides c \<otimes> b \<Longrightarrow> a divides b"
using carr monoid.m_assoc monoid_axioms monoid_cancel.l_cancel monoid_cancel_axioms by fastforce
show "a divides b \<Longrightarrow> c \<otimes> a divides c \<otimes> b"
using carr(1) carr(3) by blast
qed
lemma (in comm_monoid) divides_mult_rI [intro]:
assumes ab: "a divides b"
and carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "(a \<otimes> c) divides (b \<otimes> c)"
using carr ab by (metis divides_mult_lI m_comm)
lemma (in comm_monoid_cancel) divides_mult_r [simp]:
assumes carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "(a \<otimes> c) divides (b \<otimes> c) = a divides b"
using carr by (simp add: m_comm[of a c] m_comm[of b c])
lemma (in monoid) divides_prod_r:
assumes ab: "a divides b"
and carr: "a \<in> carrier G" "c \<in> carrier G"
shows "a divides (b \<otimes> c)"
using ab carr by (fast intro: m_assoc)
lemma (in comm_monoid) divides_prod_l:
assumes "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G" "a divides b"
shows "a divides (c \<otimes> b)"
using assms by (simp add: divides_prod_r m_comm)
lemma (in monoid) unit_divides:
assumes uunit: "u \<in> Units G"
and acarr: "a \<in> carrier G"
shows "u divides a"
proof (intro dividesI[of "(inv u) \<otimes> a"], fast intro: uunit acarr)
from uunit acarr have xcarr: "inv u \<otimes> a \<in> carrier G" by fast
from uunit acarr have "u \<otimes> (inv u \<otimes> a) = (u \<otimes> inv u) \<otimes> a"
by (fast intro: m_assoc[symmetric])
also have "\<dots> = \<one> \<otimes> a" by (simp add: Units_r_inv[OF uunit])
also from acarr have "\<dots> = a" by simp
finally show "a = u \<otimes> (inv u \<otimes> a)" ..
qed
lemma (in comm_monoid) divides_unit:
assumes udvd: "a divides u"
and carr: "a \<in> carrier G" "u \<in> Units G"
shows "a \<in> Units G"
using udvd carr by (blast intro: unit_factor)
lemma (in comm_monoid) Unit_eq_dividesone:
assumes ucarr: "u \<in> carrier G"
shows "u \<in> Units G = u divides \<one>"
using ucarr by (fast dest: divides_unit intro: unit_divides)
subsubsection \<open>Association\<close>
lemma associatedI:
fixes G (structure)
assumes "a divides b" "b divides a"
shows "a \<sim> b"
using assms by (simp add: associated_def)
lemma (in monoid) associatedI2:
assumes uunit[simp]: "u \<in> Units G"
and a: "a = b \<otimes> u"
and bcarr: "b \<in> carrier G"
shows "a \<sim> b"
using uunit bcarr
unfolding a
apply (intro associatedI)
apply (metis Units_closed divides_mult_lI one_closed r_one unit_divides)
by blast
lemma (in monoid) associatedI2':
assumes "a = b \<otimes> u"
and "u \<in> Units G"
and "b \<in> carrier G"
shows "a \<sim> b"
using assms by (intro associatedI2)
lemma associatedD:
fixes G (structure)
assumes "a \<sim> b"
shows "a divides b"
using assms by (simp add: associated_def)
lemma (in monoid_cancel) associatedD2:
assumes assoc: "a \<sim> b"
and carr: "a \<in> carrier G" "b \<in> carrier G"
shows "\<exists>u\<in>Units G. a = b \<otimes> u"
using assoc
unfolding associated_def
proof clarify
assume "b divides a"
then obtain u where ucarr: "u \<in> carrier G" and a: "a = b \<otimes> u"
by (rule dividesE)
assume "a divides b"
then obtain u' where u'carr: "u' \<in> carrier G" and b: "b = a \<otimes> u'"
by (rule dividesE)
note carr = carr ucarr u'carr
from carr have "a \<otimes> \<one> = a" by simp
also have "\<dots> = b \<otimes> u" by (simp add: a)
also have "\<dots> = a \<otimes> u' \<otimes> u" by (simp add: b)
also from carr have "\<dots> = a \<otimes> (u' \<otimes> u)" by (simp add: m_assoc)
finally have "a \<otimes> \<one> = a \<otimes> (u' \<otimes> u)" .
with carr have u1: "\<one> = u' \<otimes> u" by (fast dest: l_cancel)
from carr have "b \<otimes> \<one> = b" by simp
also have "\<dots> = a \<otimes> u'" by (simp add: b)
also have "\<dots> = b \<otimes> u \<otimes> u'" by (simp add: a)
also from carr have "\<dots> = b \<otimes> (u \<otimes> u')" by (simp add: m_assoc)
finally have "b \<otimes> \<one> = b \<otimes> (u \<otimes> u')" .
with carr have u2: "\<one> = u \<otimes> u'" by (fast dest: l_cancel)
from u'carr u1[symmetric] u2[symmetric] have "\<exists>u'\<in>carrier G. u' \<otimes> u = \<one> \<and> u \<otimes> u' = \<one>"
by fast
then have "u \<in> Units G"
by (simp add: Units_def ucarr)
with ucarr a show "\<exists>u\<in>Units G. a = b \<otimes> u" by fast
qed
lemma associatedE:
fixes G (structure)
assumes assoc: "a \<sim> b"
and e: "\<lbrakk>a divides b; b divides a\<rbrakk> \<Longrightarrow> P"
shows "P"
proof -
from assoc have "a divides b" "b divides a"
by (simp_all add: associated_def)
then show P by (elim e)
qed
lemma (in monoid_cancel) associatedE2:
assumes assoc: "a \<sim> b"
and e: "\<And>u. \<lbrakk>a = b \<otimes> u; u \<in> Units G\<rbrakk> \<Longrightarrow> P"
and carr: "a \<in> carrier G" "b \<in> carrier G"
shows "P"
proof -
from assoc and carr have "\<exists>u\<in>Units G. a = b \<otimes> u"
by (rule associatedD2)
then obtain u where "u \<in> Units G" "a = b \<otimes> u"
by auto
then show P by (elim e)
qed
lemma (in monoid) associated_refl [simp, intro!]:
assumes "a \<in> carrier G"
shows "a \<sim> a"
using assms by (fast intro: associatedI)
lemma (in monoid) associated_sym [sym]:
assumes "a \<sim> b"
shows "b \<sim> a"
using assms by (iprover intro: associatedI elim: associatedE)
lemma (in monoid) associated_trans [trans]:
assumes "a \<sim> b" "b \<sim> c"
and "a \<in> carrier G" "c \<in> carrier G"
shows "a \<sim> c"
using assms by (iprover intro: associatedI divides_trans elim: associatedE)
lemma (in monoid) division_equiv [intro, simp]: "equivalence (division_rel G)"
apply unfold_locales
apply simp_all
apply (metis associated_def)
apply (iprover intro: associated_trans)
done
subsubsection \<open>Division and associativity\<close>
lemmas divides_antisym = associatedI
lemma (in monoid) divides_cong_l [trans]:
assumes "x \<sim> x'" "x' divides y" "x \<in> carrier G"
shows "x divides y"
by (meson assms associatedD divides_trans)
lemma (in monoid) divides_cong_r [trans]:
assumes "x divides y" "y \<sim> y'" "x \<in> carrier G"
shows "x divides y'"
by (meson assms associatedD divides_trans)
lemma (in monoid) division_weak_partial_order [simp, intro!]:
"weak_partial_order (division_rel G)"
apply unfold_locales
apply (simp_all add: associated_sym divides_antisym)
apply (metis associated_trans)
apply (metis divides_trans)
by (meson associated_def divides_trans)
subsubsection \<open>Multiplication and associativity\<close>
lemma (in monoid_cancel) mult_cong_r:
assumes "b \<sim> b'" "a \<in> carrier G" "b \<in> carrier G" "b' \<in> carrier G"
shows "a \<otimes> b \<sim> a \<otimes> b'"
by (meson assms associated_def divides_mult_lI)
lemma (in comm_monoid_cancel) mult_cong_l:
assumes "a \<sim> a'" "a \<in> carrier G" "a' \<in> carrier G" "b \<in> carrier G"
shows "a \<otimes> b \<sim> a' \<otimes> b"
using assms m_comm mult_cong_r by auto
lemma (in monoid_cancel) assoc_l_cancel:
assumes "a \<in> carrier G" "b \<in> carrier G" "b' \<in> carrier G" "a \<otimes> b \<sim> a \<otimes> b'"
shows "b \<sim> b'"
by (meson assms associated_def divides_mult_l)
lemma (in comm_monoid_cancel) assoc_r_cancel:
assumes "a \<otimes> b \<sim> a' \<otimes> b" "a \<in> carrier G" "a' \<in> carrier G" "b \<in> carrier G"
shows "a \<sim> a'"
using assms assoc_l_cancel m_comm by presburger
subsubsection \<open>Units\<close>
lemma (in monoid_cancel) assoc_unit_l [trans]:
assumes "a \<sim> b"
and "b \<in> Units G"
and "a \<in> carrier G"
shows "a \<in> Units G"
using assms by (fast elim: associatedE2)
lemma (in monoid_cancel) assoc_unit_r [trans]:
assumes aunit: "a \<in> Units G"
and asc: "a \<sim> b"
and bcarr: "b \<in> carrier G"
shows "b \<in> Units G"
using aunit bcarr associated_sym[OF asc] by (blast intro: assoc_unit_l)
lemma (in comm_monoid) Units_cong:
assumes aunit: "a \<in> Units G" and asc: "a \<sim> b"
and bcarr: "b \<in> carrier G"
shows "b \<in> Units G"
using assms by (blast intro: divides_unit elim: associatedE)
lemma (in monoid) Units_assoc:
assumes units: "a \<in> Units G" "b \<in> Units G"
shows "a \<sim> b"
using units by (fast intro: associatedI unit_divides)
lemma (in monoid) Units_are_ones: "Units G {.=}\<^bsub>(division_rel G)\<^esub> {\<one>}"
proof -
have "a .\<in>\<^bsub>division_rel G\<^esub> {\<one>}" if "a \<in> Units G" for a
proof -
have "a \<sim> \<one>"
by (rule associatedI) (simp_all add: Units_closed that unit_divides)
then show ?thesis
by (simp add: elem_def)
qed
moreover have "\<one> .\<in>\<^bsub>division_rel G\<^esub> Units G"
by (simp add: equivalence.mem_imp_elem)
ultimately show ?thesis
by (auto simp: set_eq_def)
qed
lemma (in comm_monoid) Units_Lower: "Units G = Lower (division_rel G) (carrier G)"
apply (auto simp add: Units_def Lower_def)
apply (metis Units_one_closed unit_divides unit_factor)
apply (metis Unit_eq_dividesone Units_r_inv_ex m_ac(2) one_closed)
done
lemma (in monoid_cancel) associated_iff:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "a \<sim> b \<longleftrightarrow> (\<exists>c \<in> Units G. a = b \<otimes> c)"
using assms associatedI2' associatedD2 by auto
subsubsection \<open>Proper factors\<close>
lemma properfactorI:
fixes G (structure)
assumes "a divides b"
and "\<not>(b divides a)"
shows "properfactor G a b"
using assms unfolding properfactor_def by simp
lemma properfactorI2:
fixes G (structure)
assumes advdb: "a divides b"
and neq: "\<not>(a \<sim> b)"
shows "properfactor G a b"
proof (rule properfactorI, rule advdb, rule notI)
assume "b divides a"
with advdb have "a \<sim> b" by (rule associatedI)
with neq show "False" by fast
qed
lemma (in comm_monoid_cancel) properfactorI3:
assumes p: "p = a \<otimes> b"
and nunit: "b \<notin> Units G"
and carr: "a \<in> carrier G" "b \<in> carrier G"
shows "properfactor G a p"
unfolding p
using carr
apply (intro properfactorI, fast)
proof (clarsimp, elim dividesE)
fix c
assume ccarr: "c \<in> carrier G"
note [simp] = carr ccarr
have "a \<otimes> \<one> = a" by simp
also assume "a = a \<otimes> b \<otimes> c"
also have "\<dots> = a \<otimes> (b \<otimes> c)" by (simp add: m_assoc)
finally have "a \<otimes> \<one> = a \<otimes> (b \<otimes> c)" .
then have rinv: "\<one> = b \<otimes> c" by (intro l_cancel[of "a" "\<one>" "b \<otimes> c"], simp+)
also have "\<dots> = c \<otimes> b" by (simp add: m_comm)
finally have linv: "\<one> = c \<otimes> b" .
from ccarr linv[symmetric] rinv[symmetric] have "b \<in> Units G"
unfolding Units_def by fastforce
with nunit show False ..
qed
lemma properfactorE:
fixes G (structure)
assumes pf: "properfactor G a b"
and r: "\<lbrakk>a divides b; \<not>(b divides a)\<rbrakk> \<Longrightarrow> P"
shows "P"
using pf unfolding properfactor_def by (fast intro: r)
lemma properfactorE2:
fixes G (structure)
assumes pf: "properfactor G a b"
and elim: "\<lbrakk>a divides b; \<not>(a \<sim> b)\<rbrakk> \<Longrightarrow> P"
shows "P"
using pf unfolding properfactor_def by (fast elim: elim associatedE)
lemma (in monoid) properfactor_unitE:
assumes uunit: "u \<in> Units G"
and pf: "properfactor G a u"
and acarr: "a \<in> carrier G"
shows "P"
using pf unit_divides[OF uunit acarr] by (fast elim: properfactorE)
lemma (in monoid) properfactor_divides:
assumes pf: "properfactor G a b"
shows "a divides b"
using pf by (elim properfactorE)
lemma (in monoid) properfactor_trans1 [trans]:
assumes "a divides b" "properfactor G b c" "a \<in> carrier G" "c \<in> carrier G"
shows "properfactor G a c"
by (meson divides_trans properfactorE properfactorI assms)
lemma (in monoid) properfactor_trans2 [trans]:
assumes "properfactor G a b" "b divides c" "a \<in> carrier G" "b \<in> carrier G"
shows "properfactor G a c"
by (meson divides_trans properfactorE properfactorI assms)
lemma properfactor_lless:
fixes G (structure)
shows "properfactor G = lless (division_rel G)"
by (force simp: lless_def properfactor_def associated_def)
lemma (in monoid) properfactor_cong_l [trans]:
assumes x'x: "x' \<sim> x"
and pf: "properfactor G x y"
and carr: "x \<in> carrier G" "x' \<in> carrier G" "y \<in> carrier G"
shows "properfactor G x' y"
using pf
unfolding properfactor_lless
proof -
interpret weak_partial_order "division_rel G" ..
from x'x have "x' .=\<^bsub>division_rel G\<^esub> x" by simp
also assume "x \<sqsubset>\<^bsub>division_rel G\<^esub> y"
finally show "x' \<sqsubset>\<^bsub>division_rel G\<^esub> y" by (simp add: carr)
qed
lemma (in monoid) properfactor_cong_r [trans]:
assumes pf: "properfactor G x y"
and yy': "y \<sim> y'"
and carr: "x \<in> carrier G" "y \<in> carrier G" "y' \<in> carrier G"
shows "properfactor G x y'"
using pf
unfolding properfactor_lless
proof -
interpret weak_partial_order "division_rel G" ..
assume "x \<sqsubset>\<^bsub>division_rel G\<^esub> y"
also from yy'
have "y .=\<^bsub>division_rel G\<^esub> y'" by simp
finally show "x \<sqsubset>\<^bsub>division_rel G\<^esub> y'" by (simp add: carr)
qed
lemma (in monoid_cancel) properfactor_mult_lI [intro]:
assumes ab: "properfactor G a b"
and carr: "a \<in> carrier G" "c \<in> carrier G"
shows "properfactor G (c \<otimes> a) (c \<otimes> b)"
using ab carr by (fastforce elim: properfactorE intro: properfactorI)
lemma (in monoid_cancel) properfactor_mult_l [simp]:
assumes carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "properfactor G (c \<otimes> a) (c \<otimes> b) = properfactor G a b"
using carr by (fastforce elim: properfactorE intro: properfactorI)
lemma (in comm_monoid_cancel) properfactor_mult_rI [intro]:
assumes ab: "properfactor G a b"
and carr: "a \<in> carrier G" "c \<in> carrier G"
shows "properfactor G (a \<otimes> c) (b \<otimes> c)"
using ab carr by (fastforce elim: properfactorE intro: properfactorI)
lemma (in comm_monoid_cancel) properfactor_mult_r [simp]:
assumes carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "properfactor G (a \<otimes> c) (b \<otimes> c) = properfactor G a b"
using carr by (fastforce elim: properfactorE intro: properfactorI)
lemma (in monoid) properfactor_prod_r:
assumes ab: "properfactor G a b"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "properfactor G a (b \<otimes> c)"
by (intro properfactor_trans2[OF ab] divides_prod_r) simp_all
lemma (in comm_monoid) properfactor_prod_l:
assumes ab: "properfactor G a b"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "properfactor G a (c \<otimes> b)"
by (intro properfactor_trans2[OF ab] divides_prod_l) simp_all
subsection \<open>Irreducible Elements and Primes\<close>
subsubsection \<open>Irreducible elements\<close>
lemma irreducibleI:
fixes G (structure)
assumes "a \<notin> Units G"
and "\<And>b. \<lbrakk>b \<in> carrier G; properfactor G b a\<rbrakk> \<Longrightarrow> b \<in> Units G"
shows "irreducible G a"
using assms unfolding irreducible_def by blast
lemma irreducibleE:
fixes G (structure)
assumes irr: "irreducible G a"
and elim: "\<lbrakk>a \<notin> Units G; \<forall>b. b \<in> carrier G \<and> properfactor G b a \<longrightarrow> b \<in> Units G\<rbrakk> \<Longrightarrow> P"
shows "P"
using assms unfolding irreducible_def by blast
lemma irreducibleD:
fixes G (structure)
assumes irr: "irreducible G a"
and pf: "properfactor G b a"
and bcarr: "b \<in> carrier G"
shows "b \<in> Units G"
using assms by (fast elim: irreducibleE)
lemma (in monoid_cancel) irreducible_cong [trans]:
assumes "irreducible G a" "a \<sim> a'" "a \<in> carrier G" "a' \<in> carrier G"
shows "irreducible G a'"
proof -
have "a' divides a"
by (meson \<open>a \<sim> a'\<close> associated_def)
then show ?thesis
by (metis (no_types) assms assoc_unit_l irreducibleE irreducibleI monoid.properfactor_trans2 monoid_axioms)
qed
lemma (in monoid) irreducible_prod_rI:
assumes "irreducible G a" "b \<in> Units G" "a \<in> carrier G" "b \<in> carrier G"
shows "irreducible G (a \<otimes> b)"
using assms
by (metis (no_types, lifting) associatedI2' irreducible_def monoid.m_closed monoid_axioms prod_unit_r properfactor_cong_r)
lemma (in comm_monoid) irreducible_prod_lI:
assumes birr: "irreducible G b"
and aunit: "a \<in> Units G"
and carr [simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "irreducible G (a \<otimes> b)"
by (metis aunit birr carr irreducible_prod_rI m_comm)
lemma (in comm_monoid_cancel) irreducible_prodE [elim]:
assumes irr: "irreducible G (a \<otimes> b)"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G"
and e1: "\<lbrakk>irreducible G a; b \<in> Units G\<rbrakk> \<Longrightarrow> P"
and e2: "\<lbrakk>a \<in> Units G; irreducible G b\<rbrakk> \<Longrightarrow> P"
shows P
using irr
proof (elim irreducibleE)
assume abnunit: "a \<otimes> b \<notin> Units G"
and isunit[rule_format]: "\<forall>ba. ba \<in> carrier G \<and> properfactor G ba (a \<otimes> b) \<longrightarrow> ba \<in> Units G"
show P
proof (cases "a \<in> Units G")
case aunit: True
have "irreducible G b"
proof (rule irreducibleI, rule notI)
assume "b \<in> Units G"
with aunit have "(a \<otimes> b) \<in> Units G" by fast
with abnunit show "False" ..
next
fix c
assume ccarr: "c \<in> carrier G"
and "properfactor G c b"
then have "properfactor G c (a \<otimes> b)" by (simp add: properfactor_prod_l[of c b a])
with ccarr show "c \<in> Units G" by (fast intro: isunit)
qed
with aunit show "P" by (rule e2)
next
case anunit: False
with carr have "properfactor G b (b \<otimes> a)" by (fast intro: properfactorI3)
then have bf: "properfactor G b (a \<otimes> b)" by (subst m_comm[of a b], simp+)
then have bunit: "b \<in> Units G" by (intro isunit, simp)
have "irreducible G a"
proof (rule irreducibleI, rule notI)
assume "a \<in> Units G"
with bunit have "(a \<otimes> b) \<in> Units G" by fast
with abnunit show "False" ..
next
fix c
assume ccarr: "c \<in> carrier G"
and "properfactor G c a"
then have "properfactor G c (a \<otimes> b)"
by (simp add: properfactor_prod_r[of c a b])
with ccarr show "c \<in> Units G" by (fast intro: isunit)
qed
from this bunit show "P" by (rule e1)
qed
qed
subsubsection \<open>Prime elements\<close>
lemma primeI:
fixes G (structure)
assumes "p \<notin> Units G"
and "\<And>a b. \<lbrakk>a \<in> carrier G; b \<in> carrier G; p divides (a \<otimes> b)\<rbrakk> \<Longrightarrow> p divides a \<or> p divides b"
shows "prime G p"
using assms unfolding prime_def by blast
lemma primeE:
fixes G (structure)
assumes pprime: "prime G p"
and e: "\<lbrakk>p \<notin> Units G; \<forall>a\<in>carrier G. \<forall>b\<in>carrier G.
p divides a \<otimes> b \<longrightarrow> p divides a \<or> p divides b\<rbrakk> \<Longrightarrow> P"
shows "P"
using pprime unfolding prime_def by (blast dest: e)
lemma (in comm_monoid_cancel) prime_divides:
assumes carr: "a \<in> carrier G" "b \<in> carrier G"
and pprime: "prime G p"
and pdvd: "p divides a \<otimes> b"
shows "p divides a \<or> p divides b"
using assms by (blast elim: primeE)
lemma (in monoid_cancel) prime_cong [trans]:
assumes "prime G p"
and pp': "p \<sim> p'" "p \<in> carrier G" "p' \<in> carrier G"
shows "prime G p'"
using assms
by (auto simp: prime_def assoc_unit_l) (metis pp' associated_sym divides_cong_l)
lemma (in comm_monoid_cancel) prime_irreducible: \<^marker>\<open>contributor \<open>Paulo EmÃlio de Vilhena\<close>\<close>
assumes "prime G p"
shows "irreducible G p"
proof (rule irreducibleI)
show "p \<notin> Units G"
using assms unfolding prime_def by simp
next
fix b assume A: "b \<in> carrier G" "properfactor G b p"
then obtain c where c: "c \<in> carrier G" "p = b \<otimes> c"
unfolding properfactor_def factor_def by auto
hence "p divides c"
using A assms unfolding prime_def properfactor_def by auto
then obtain b' where b': "b' \<in> carrier G" "c = p \<otimes> b'"
unfolding factor_def by auto
hence "\<one> = b \<otimes> b'"
by (metis A(1) l_cancel m_closed m_lcomm one_closed r_one c)
thus "b \<in> Units G"
using A(1) Units_one_closed b'(1) unit_factor by presburger
qed
subsection \<open>Factorization and Factorial Monoids\<close>
subsubsection \<open>Function definitions\<close>
definition factors :: "[_, 'a list, 'a] \<Rightarrow> bool"
where "factors G fs a \<longleftrightarrow> (\<forall>x \<in> (set fs). irreducible G x) \<and> foldr (\<otimes>\<^bsub>G\<^esub>) fs \<one>\<^bsub>G\<^esub> = a"
definition wfactors ::"[_, 'a list, 'a] \<Rightarrow> bool"
where "wfactors G fs a \<longleftrightarrow> (\<forall>x \<in> (set fs). irreducible G x) \<and> foldr (\<otimes>\<^bsub>G\<^esub>) fs \<one>\<^bsub>G\<^esub> \<sim>\<^bsub>G\<^esub> a"
abbreviation list_assoc :: "('a,_) monoid_scheme \<Rightarrow> 'a list \<Rightarrow> 'a list \<Rightarrow> bool" (infix "[\<sim>]\<index>" 44)
where "list_assoc G \<equiv> list_all2 (\<sim>\<^bsub>G\<^esub>)"
definition essentially_equal :: "[_, 'a list, 'a list] \<Rightarrow> bool"
where "essentially_equal G fs1 fs2 \<longleftrightarrow> (\<exists>fs1'. fs1 <~~> fs1' \<and> fs1' [\<sim>]\<^bsub>G\<^esub> fs2)"
locale factorial_monoid = comm_monoid_cancel +
assumes factors_exist: "\<lbrakk>a \<in> carrier G; a \<notin> Units G\<rbrakk> \<Longrightarrow> \<exists>fs. set fs \<subseteq> carrier G \<and> factors G fs a"
and factors_unique:
"\<lbrakk>factors G fs a; factors G fs' a; a \<in> carrier G; a \<notin> Units G;
set fs \<subseteq> carrier G; set fs' \<subseteq> carrier G\<rbrakk> \<Longrightarrow> essentially_equal G fs fs'"
subsubsection \<open>Comparing lists of elements\<close>
text \<open>Association on lists\<close>
lemma (in monoid) listassoc_refl [simp, intro]:
assumes "set as \<subseteq> carrier G"
shows "as [\<sim>] as"
using assms by (induct as) simp_all
lemma (in monoid) listassoc_sym [sym]:
assumes "as [\<sim>] bs"
and "set as \<subseteq> carrier G"
and "set bs \<subseteq> carrier G"
shows "bs [\<sim>] as"
using assms
proof (induction as arbitrary: bs)
case Cons
then show ?case
by (induction bs) (use associated_sym in auto)
qed auto
lemma (in monoid) listassoc_trans [trans]:
assumes "as [\<sim>] bs" and "bs [\<sim>] cs"
and "set as \<subseteq> carrier G" and "set bs \<subseteq> carrier G" and "set cs \<subseteq> carrier G"
shows "as [\<sim>] cs"
using assms
apply (simp add: list_all2_conv_all_nth set_conv_nth, safe)
by (metis (mono_tags, lifting) associated_trans nth_mem subsetCE)
lemma (in monoid_cancel) irrlist_listassoc_cong:
assumes "\<forall>a\<in>set as. irreducible G a"
and "as [\<sim>] bs"
and "set as \<subseteq> carrier G" and "set bs \<subseteq> carrier G"
shows "\<forall>a\<in>set bs. irreducible G a"
using assms
by (fastforce simp add: list_all2_conv_all_nth set_conv_nth intro: irreducible_cong)
text \<open>Permutations\<close>
lemma perm_map [intro]:
assumes p: "a <~~> b"
shows "map f a <~~> map f b"
using p by induct auto
lemma perm_map_switch:
assumes m: "map f a = map f b" and p: "b <~~> c"
shows "\<exists>d. a <~~> d \<and> map f d = map f c"
using p m by (induct arbitrary: a) (simp, force, force, blast)
lemma (in monoid) perm_assoc_switch:
assumes a:"as [\<sim>] bs" and p: "bs <~~> cs"
shows "\<exists>bs'. as <~~> bs' \<and> bs' [\<sim>] cs"
using p a
proof (induction bs cs arbitrary: as)
case (swap y x l)
then show ?case
by (metis (no_types, hide_lams) list_all2_Cons2 perm.swap)
next
case (Cons xs ys z)
then show ?case
by (metis list_all2_Cons2 perm.Cons)
next
case (trans xs ys zs)
then show ?case
by (meson perm.trans)
qed auto
lemma (in monoid) perm_assoc_switch_r:
assumes p: "as <~~> bs" and a:"bs [\<sim>] cs"
shows "\<exists>bs'. as [\<sim>] bs' \<and> bs' <~~> cs"
using p a
proof (induction as bs arbitrary: cs)
case Nil
then show ?case
by auto
next
case (swap y x l)
then show ?case
by (metis (no_types, hide_lams) list_all2_Cons1 perm.swap)
next
case (Cons xs ys z)
then show ?case
by (metis list_all2_Cons1 perm.Cons)
next
case (trans xs ys zs)
then show ?case
by (blast intro: elim: )
qed
declare perm_sym [sym]
lemma perm_setP:
assumes perm: "as <~~> bs"
and as: "P (set as)"
shows "P (set bs)"
proof -
from perm have "mset as = mset bs"
by (simp add: mset_eq_perm)
then have "set as = set bs"
by (rule mset_eq_setD)
with as show "P (set bs)"
by simp
qed
lemmas (in monoid) perm_closed = perm_setP[of _ _ "\<lambda>as. as \<subseteq> carrier G"]
lemmas (in monoid) irrlist_perm_cong = perm_setP[of _ _ "\<lambda>as. \<forall>a\<in>as. irreducible G a"]
text \<open>Essentially equal factorizations\<close>
lemma (in monoid) essentially_equalI:
assumes ex: "fs1 <~~> fs1'" "fs1' [\<sim>] fs2"
shows "essentially_equal G fs1 fs2"
using ex unfolding essentially_equal_def by fast
lemma (in monoid) essentially_equalE:
assumes ee: "essentially_equal G fs1 fs2"
and e: "\<And>fs1'. \<lbrakk>fs1 <~~> fs1'; fs1' [\<sim>] fs2\<rbrakk> \<Longrightarrow> P"
shows "P"
using ee unfolding essentially_equal_def by (fast intro: e)
lemma (in monoid) ee_refl [simp,intro]:
assumes carr: "set as \<subseteq> carrier G"
shows "essentially_equal G as as"
using carr by (fast intro: essentially_equalI)
lemma (in monoid) ee_sym [sym]:
assumes ee: "essentially_equal G as bs"
and carr: "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G"
shows "essentially_equal G bs as"
using ee
proof (elim essentially_equalE)
fix fs
assume "as <~~> fs" "fs [\<sim>] bs"
from perm_assoc_switch_r [OF this] obtain fs' where a: "as [\<sim>] fs'" and p: "fs' <~~> bs"
by blast
from p have "bs <~~> fs'" by (rule perm_sym)
with a[symmetric] carr show ?thesis
by (iprover intro: essentially_equalI perm_closed)
qed
lemma (in monoid) ee_trans [trans]:
assumes ab: "essentially_equal G as bs" and bc: "essentially_equal G bs cs"
and ascarr: "set as \<subseteq> carrier G"
and bscarr: "set bs \<subseteq> carrier G"
and cscarr: "set cs \<subseteq> carrier G"
shows "essentially_equal G as cs"
using ab bc
proof (elim essentially_equalE)
fix abs bcs
assume "abs [\<sim>] bs" and pb: "bs <~~> bcs"
from perm_assoc_switch [OF this] obtain bs' where p: "abs <~~> bs'" and a: "bs' [\<sim>] bcs"
by blast
assume "as <~~> abs"
with p have pp: "as <~~> bs'" by fast
from pp ascarr have c1: "set bs' \<subseteq> carrier G" by (rule perm_closed)
from pb bscarr have c2: "set bcs \<subseteq> carrier G" by (rule perm_closed)
assume "bcs [\<sim>] cs"
then have "bs' [\<sim>] cs"
using a c1 c2 cscarr listassoc_trans by blast
with pp show ?thesis
by (rule essentially_equalI)
qed
subsubsection \<open>Properties of lists of elements\<close>
text \<open>Multiplication of factors in a list\<close>
lemma (in monoid) multlist_closed [simp, intro]:
assumes ascarr: "set fs \<subseteq> carrier G"
shows "foldr (\<otimes>) fs \<one> \<in> carrier G"
using ascarr by (induct fs) simp_all
lemma (in comm_monoid) multlist_dividesI:
assumes "f \<in> set fs" and "set fs \<subseteq> carrier G"
shows "f divides (foldr (\<otimes>) fs \<one>)"
using assms
proof (induction fs)
case (Cons a fs)
then have f: "f \<in> carrier G"
by blast
show ?case
using Cons.IH Cons.prems(1) Cons.prems(2) divides_prod_l f by auto
qed auto
lemma (in comm_monoid_cancel) multlist_listassoc_cong:
assumes "fs [\<sim>] fs'"
and "set fs \<subseteq> carrier G" and "set fs' \<subseteq> carrier G"
shows "foldr (\<otimes>) fs \<one> \<sim> foldr (\<otimes>) fs' \<one>"
using assms
proof (induct fs arbitrary: fs')
case (Cons a as fs')
then show ?case
proof (induction fs')
case (Cons b bs)
then have p: "a \<otimes> foldr (\<otimes>) as \<one> \<sim> b \<otimes> foldr (\<otimes>) as \<one>"
by (simp add: mult_cong_l)
then have "foldr (\<otimes>) as \<one> \<sim> foldr (\<otimes>) bs \<one>"
using Cons by auto
with Cons have "b \<otimes> foldr (\<otimes>) as \<one> \<sim> b \<otimes> foldr (\<otimes>) bs \<one>"
by (simp add: mult_cong_r)
then show ?case
using Cons.prems(3) Cons.prems(4) monoid.associated_trans monoid_axioms p by force
qed auto
qed auto
lemma (in comm_monoid) multlist_perm_cong:
assumes prm: "as <~~> bs"
and ascarr: "set as \<subseteq> carrier G"
shows "foldr (\<otimes>) as \<one> = foldr (\<otimes>) bs \<one>"
using prm ascarr
proof induction
case (swap y x l) then show ?case
by (simp add: m_lcomm)
next
case (trans xs ys zs) then show ?case
using perm_closed by auto
qed auto
lemma (in comm_monoid_cancel) multlist_ee_cong:
assumes "essentially_equal G fs fs'"
and "set fs \<subseteq> carrier G" and "set fs' \<subseteq> carrier G"
shows "foldr (\<otimes>) fs \<one> \<sim> foldr (\<otimes>) fs' \<one>"
using assms
by (metis essentially_equal_def multlist_listassoc_cong multlist_perm_cong perm_closed)
subsubsection \<open>Factorization in irreducible elements\<close>
lemma wfactorsI:
fixes G (structure)
assumes "\<forall>f\<in>set fs. irreducible G f"
and "foldr (\<otimes>) fs \<one> \<sim> a"
shows "wfactors G fs a"
using assms unfolding wfactors_def by simp
lemma wfactorsE:
fixes G (structure)
assumes wf: "wfactors G fs a"
and e: "\<lbrakk>\<forall>f\<in>set fs. irreducible G f; foldr (\<otimes>) fs \<one> \<sim> a\<rbrakk> \<Longrightarrow> P"
shows "P"
using wf unfolding wfactors_def by (fast dest: e)
lemma (in monoid) factorsI:
assumes "\<forall>f\<in>set fs. irreducible G f"
and "foldr (\<otimes>) fs \<one> = a"
shows "factors G fs a"
using assms unfolding factors_def by simp
lemma factorsE:
fixes G (structure)
assumes f: "factors G fs a"
and e: "\<lbrakk>\<forall>f\<in>set fs. irreducible G f; foldr (\<otimes>) fs \<one> = a\<rbrakk> \<Longrightarrow> P"
shows "P"
using f unfolding factors_def by (simp add: e)
lemma (in monoid) factors_wfactors:
assumes "factors G as a" and "set as \<subseteq> carrier G"
shows "wfactors G as a"
using assms by (blast elim: factorsE intro: wfactorsI)
lemma (in monoid) wfactors_factors:
assumes "wfactors G as a" and "set as \<subseteq> carrier G"
shows "\<exists>a'. factors G as a' \<and> a' \<sim> a"
using assms by (blast elim: wfactorsE intro: factorsI)
lemma (in monoid) factors_closed [dest]:
assumes "factors G fs a" and "set fs \<subseteq> carrier G"
shows "a \<in> carrier G"
using assms by (elim factorsE, clarsimp)
lemma (in monoid) nunit_factors:
assumes anunit: "a \<notin> Units G"
and fs: "factors G as a"
shows "length as > 0"
proof -
from anunit Units_one_closed have "a \<noteq> \<one>" by auto
with fs show ?thesis by (auto elim: factorsE)
qed
lemma (in monoid) unit_wfactors [simp]:
assumes aunit: "a \<in> Units G"
shows "wfactors G [] a"
using aunit by (intro wfactorsI) (simp, simp add: Units_assoc)
lemma (in comm_monoid_cancel) unit_wfactors_empty:
assumes aunit: "a \<in> Units G"
and wf: "wfactors G fs a"
and carr[simp]: "set fs \<subseteq> carrier G"
shows "fs = []"
proof (cases fs)
case fs: (Cons f fs')
from carr have fcarr[simp]: "f \<in> carrier G" and carr'[simp]: "set fs' \<subseteq> carrier G"
by (simp_all add: fs)
from fs wf have "irreducible G f" by (simp add: wfactors_def)
then have fnunit: "f \<notin> Units G" by (fast elim: irreducibleE)
from fs wf have a: "f \<otimes> foldr (\<otimes>) fs' \<one> \<sim> a" by (simp add: wfactors_def)
note aunit
also from fs wf
have a: "f \<otimes> foldr (\<otimes>) fs' \<one> \<sim> a" by (simp add: wfactors_def)
have "a \<sim> f \<otimes> foldr (\<otimes>) fs' \<one>"
by (simp add: Units_closed[OF aunit] a[symmetric])
finally have "f \<otimes> foldr (\<otimes>) fs' \<one> \<in> Units G" by simp
then have "f \<in> Units G" by (intro unit_factor[of f], simp+)
with fnunit show ?thesis by contradiction
qed
text \<open>Comparing wfactors\<close>
lemma (in comm_monoid_cancel) wfactors_listassoc_cong_l:
assumes fact: "wfactors G fs a"
and asc: "fs [\<sim>] fs'"
and carr: "a \<in> carrier G" "set fs \<subseteq> carrier G" "set fs' \<subseteq> carrier G"
shows "wfactors G fs' a"
proof -
{ from asc[symmetric] have "foldr (\<otimes>) fs' \<one> \<sim> foldr (\<otimes>) fs \<one>"
by (simp add: multlist_listassoc_cong carr)
also assume "foldr (\<otimes>) fs \<one> \<sim> a"
finally have "foldr (\<otimes>) fs' \<one> \<sim> a" by (simp add: carr) }
then show ?thesis
using fact
by (meson asc carr(2) carr(3) irrlist_listassoc_cong wfactors_def)
qed
lemma (in comm_monoid) wfactors_perm_cong_l:
assumes "wfactors G fs a"
and "fs <~~> fs'"
and "set fs \<subseteq> carrier G"
shows "wfactors G fs' a"
using assms irrlist_perm_cong multlist_perm_cong wfactors_def by fastforce
lemma (in comm_monoid_cancel) wfactors_ee_cong_l [trans]:
assumes ee: "essentially_equal G as bs"
and bfs: "wfactors G bs b"
and carr: "b \<in> carrier G" "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G"
shows "wfactors G as b"
using ee
proof (elim essentially_equalE)
fix fs
assume prm: "as <~~> fs"
with carr have fscarr: "set fs \<subseteq> carrier G" by (simp add: perm_closed)
note bfs
also assume [symmetric]: "fs [\<sim>] bs"
also (wfactors_listassoc_cong_l)
note prm[symmetric]
finally (wfactors_perm_cong_l)
show "wfactors G as b" by (simp add: carr fscarr)
qed
lemma (in monoid) wfactors_cong_r [trans]:
assumes fac: "wfactors G fs a" and aa': "a \<sim> a'"
and carr[simp]: "a \<in> carrier G" "a' \<in> carrier G" "set fs \<subseteq> carrier G"
shows "wfactors G fs a'"
using fac
proof (elim wfactorsE, intro wfactorsI)
assume "foldr (\<otimes>) fs \<one> \<sim> a" also note aa'
finally show "foldr (\<otimes>) fs \<one> \<sim> a'" by simp
qed
subsubsection \<open>Essentially equal factorizations\<close>
lemma (in comm_monoid_cancel) unitfactor_ee:
assumes uunit: "u \<in> Units G"
and carr: "set as \<subseteq> carrier G"
shows "essentially_equal G (as[0 := (as!0 \<otimes> u)]) as"
(is "essentially_equal G ?as' as")
proof -
have "as[0 := as ! 0 \<otimes> u] [\<sim>] as"
proof (cases as)
case (Cons a as')
then show ?thesis
using associatedI2 carr uunit by auto
qed auto
then show ?thesis
using essentially_equal_def by blast
qed
lemma (in comm_monoid_cancel) factors_cong_unit:
assumes u: "u \<in> Units G"
and a: "a \<notin> Units G"
and afs: "factors G as a"
and ascarr: "set as \<subseteq> carrier G"
shows "factors G (as[0 := (as!0 \<otimes> u)]) (a \<otimes> u)"
(is "factors G ?as' ?a'")
proof (cases as)
case Nil
then show ?thesis
using afs a nunit_factors by auto
next
case (Cons b bs)
have *: "\<forall>f\<in>set as. irreducible G f" "foldr (\<otimes>) as \<one> = a"
using afs by (auto simp: factors_def)
show ?thesis
proof (intro factorsI)
show "foldr (\<otimes>) (as[0 := as ! 0 \<otimes> u]) \<one> = a \<otimes> u"
using Cons u ascarr * by (auto simp add: m_ac Units_closed)
show "\<forall>f\<in>set (as[0 := as ! 0 \<otimes> u]). irreducible G f"
using Cons u ascarr * by (force intro: irreducible_prod_rI)
qed
qed
lemma (in comm_monoid) perm_wfactorsD:
assumes prm: "as <~~> bs"
and afs: "wfactors G as a"
and bfs: "wfactors G bs b"
and [simp]: "a \<in> carrier G" "b \<in> carrier G"
and ascarr [simp]: "set as \<subseteq> carrier G"
shows "a \<sim> b"
using afs bfs
proof (elim wfactorsE)
from prm have [simp]: "set bs \<subseteq> carrier G" by (simp add: perm_closed)
assume "foldr (\<otimes>) as \<one> \<sim> a"
then have "a \<sim> foldr (\<otimes>) as \<one>"
by (simp add: associated_sym)
also from prm
have "foldr (\<otimes>) as \<one> = foldr (\<otimes>) bs \<one>" by (rule multlist_perm_cong, simp)
also assume "foldr (\<otimes>) bs \<one> \<sim> b"
finally show "a \<sim> b" by simp
qed
lemma (in comm_monoid_cancel) listassoc_wfactorsD:
assumes assoc: "as [\<sim>] bs"
and afs: "wfactors G as a"
and bfs: "wfactors G bs b"
and [simp]: "a \<in> carrier G" "b \<in> carrier G"
and [simp]: "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G"
shows "a \<sim> b"
using afs bfs
proof (elim wfactorsE)
assume "foldr (\<otimes>) as \<one> \<sim> a"
then have "a \<sim> foldr (\<otimes>) as \<one>" by (simp add: associated_sym)
also from assoc
have "foldr (\<otimes>) as \<one> \<sim> foldr (\<otimes>) bs \<one>" by (rule multlist_listassoc_cong, simp+)
also assume "foldr (\<otimes>) bs \<one> \<sim> b"
finally show "a \<sim> b" by simp
qed
lemma (in comm_monoid_cancel) ee_wfactorsD:
assumes ee: "essentially_equal G as bs"
and afs: "wfactors G as a" and bfs: "wfactors G bs b"
and [simp]: "a \<in> carrier G" "b \<in> carrier G"
and ascarr[simp]: "set as \<subseteq> carrier G" and bscarr[simp]: "set bs \<subseteq> carrier G"
shows "a \<sim> b"
using ee
proof (elim essentially_equalE)
fix fs
assume prm: "as <~~> fs"
then have as'carr[simp]: "set fs \<subseteq> carrier G"
by (simp add: perm_closed)
from afs prm have afs': "wfactors G fs a"
by (rule wfactors_perm_cong_l) simp
assume "fs [\<sim>] bs"
from this afs' bfs show "a \<sim> b"
by (rule listassoc_wfactorsD) simp_all
qed
lemma (in comm_monoid_cancel) ee_factorsD:
assumes ee: "essentially_equal G as bs"
and afs: "factors G as a" and bfs:"factors G bs b"
and "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G"
shows "a \<sim> b"
using assms by (blast intro: factors_wfactors dest: ee_wfactorsD)
lemma (in factorial_monoid) ee_factorsI:
assumes ab: "a \<sim> b"
and afs: "factors G as a" and anunit: "a \<notin> Units G"
and bfs: "factors G bs b" and bnunit: "b \<notin> Units G"
and ascarr: "set as \<subseteq> carrier G" and bscarr: "set bs \<subseteq> carrier G"
shows "essentially_equal G as bs"
proof -
note carr[simp] = factors_closed[OF afs ascarr] ascarr[THEN subsetD]
factors_closed[OF bfs bscarr] bscarr[THEN subsetD]
from ab carr obtain u where uunit: "u \<in> Units G" and a: "a = b \<otimes> u"
by (elim associatedE2)
from uunit bscarr have ee: "essentially_equal G (bs[0 := (bs!0 \<otimes> u)]) bs"
(is "essentially_equal G ?bs' bs")
by (rule unitfactor_ee)
from bscarr uunit have bs'carr: "set ?bs' \<subseteq> carrier G"
by (cases bs) (simp_all add: Units_closed)
from uunit bnunit bfs bscarr have fac: "factors G ?bs' (b \<otimes> u)"
by (rule factors_cong_unit)
from afs fac[simplified a[symmetric]] ascarr bs'carr anunit
have "essentially_equal G as ?bs'"
by (blast intro: factors_unique)
also note ee
finally show "essentially_equal G as bs"
by (simp add: ascarr bscarr bs'carr)
qed
lemma (in factorial_monoid) ee_wfactorsI:
assumes asc: "a \<sim> b"
and asf: "wfactors G as a" and bsf: "wfactors G bs b"
and acarr[simp]: "a \<in> carrier G" and bcarr[simp]: "b \<in> carrier G"
and ascarr[simp]: "set as \<subseteq> carrier G" and bscarr[simp]: "set bs \<subseteq> carrier G"
shows "essentially_equal G as bs"
using assms
proof (cases "a \<in> Units G")
case aunit: True
also note asc
finally have bunit: "b \<in> Units G" by simp
from aunit asf ascarr have e: "as = []"
by (rule unit_wfactors_empty)
from bunit bsf bscarr have e': "bs = []"
by (rule unit_wfactors_empty)
have "essentially_equal G [] []"
by (fast intro: essentially_equalI)
then show ?thesis
by (simp add: e e')
next
case anunit: False
have bnunit: "b \<notin> Units G"
proof clarify
assume "b \<in> Units G"
also note asc[symmetric]
finally have "a \<in> Units G" by simp
with anunit show False ..
qed
from wfactors_factors[OF asf ascarr] obtain a' where fa': "factors G as a'" and a': "a' \<sim> a"
by blast
from fa' ascarr have a'carr[simp]: "a' \<in> carrier G"
by fast
have a'nunit: "a' \<notin> Units G"
proof clarify
assume "a' \<in> Units G"
also note a'
finally have "a \<in> Units G" by simp
with anunit
show "False" ..
qed
from wfactors_factors[OF bsf bscarr] obtain b' where fb': "factors G bs b'" and b': "b' \<sim> b"
by blast
from fb' bscarr have b'carr[simp]: "b' \<in> carrier G"
by fast
have b'nunit: "b' \<notin> Units G"
proof clarify
assume "b' \<in> Units G"
also note b'
finally have "b \<in> Units G" by simp
with bnunit show False ..
qed
note a'
also note asc
also note b'[symmetric]
finally have "a' \<sim> b'" by simp
from this fa' a'nunit fb' b'nunit ascarr bscarr show "essentially_equal G as bs"
by (rule ee_factorsI)
qed
lemma (in factorial_monoid) ee_wfactors:
assumes asf: "wfactors G as a"
and bsf: "wfactors G bs b"
and acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G"
and ascarr: "set as \<subseteq> carrier G" and bscarr: "set bs \<subseteq> carrier G"
shows asc: "a \<sim> b = essentially_equal G as bs"
using assms by (fast intro: ee_wfactorsI ee_wfactorsD)
lemma (in factorial_monoid) wfactors_exist [intro, simp]:
assumes acarr[simp]: "a \<in> carrier G"
shows "\<exists>fs. set fs \<subseteq> carrier G \<and> wfactors G fs a"
proof (cases "a \<in> Units G")
case True
then have "wfactors G [] a" by (rule unit_wfactors)
then show ?thesis by (intro exI) force
next
case False
with factors_exist [OF acarr] obtain fs where fscarr: "set fs \<subseteq> carrier G" and f: "factors G fs a"
by blast
from f have "wfactors G fs a" by (rule factors_wfactors) fact
with fscarr show ?thesis by fast
qed
lemma (in monoid) wfactors_prod_exists [intro, simp]:
assumes "\<forall>a \<in> set as. irreducible G a" and "set as \<subseteq> carrier G"
shows "\<exists>a. a \<in> carrier G \<and> wfactors G as a"
unfolding wfactors_def using assms by blast
lemma (in factorial_monoid) wfactors_unique:
assumes "wfactors G fs a"
and "wfactors G fs' a"
and "a \<in> carrier G"
and "set fs \<subseteq> carrier G"
and "set fs' \<subseteq> carrier G"
shows "essentially_equal G fs fs'"
using assms by (fast intro: ee_wfactorsI[of a a])
lemma (in monoid) factors_mult_single:
assumes "irreducible G a" and "factors G fb b" and "a \<in> carrier G"
shows "factors G (a # fb) (a \<otimes> b)"
using assms unfolding factors_def by simp
lemma (in monoid_cancel) wfactors_mult_single:
assumes f: "irreducible G a" "wfactors G fb b"
"a \<in> carrier G" "b \<in> carrier G" "set fb \<subseteq> carrier G"
shows "wfactors G (a # fb) (a \<otimes> b)"
using assms unfolding wfactors_def by (simp add: mult_cong_r)
lemma (in monoid) factors_mult:
assumes factors: "factors G fa a" "factors G fb b"
and ascarr: "set fa \<subseteq> carrier G"
and bscarr: "set fb \<subseteq> carrier G"
shows "factors G (fa @ fb) (a \<otimes> b)"
proof -
have "foldr (\<otimes>) (fa @ fb) \<one> = foldr (\<otimes>) fa \<one> \<otimes> foldr (\<otimes>) fb \<one>" if "set fa \<subseteq> carrier G"
"Ball (set fa) (irreducible G)"
using that bscarr by (induct fa) (simp_all add: m_assoc)
then show ?thesis
using assms unfolding factors_def by force
qed
lemma (in comm_monoid_cancel) wfactors_mult [intro]:
assumes asf: "wfactors G as a" and bsf:"wfactors G bs b"
and acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G"
and ascarr: "set as \<subseteq> carrier G" and bscarr:"set bs \<subseteq> carrier G"
shows "wfactors G (as @ bs) (a \<otimes> b)"
using wfactors_factors[OF asf ascarr] and wfactors_factors[OF bsf bscarr]
proof clarsimp
fix a' b'
assume asf': "factors G as a'" and a'a: "a' \<sim> a"
and bsf': "factors G bs b'" and b'b: "b' \<sim> b"
from asf' have a'carr: "a' \<in> carrier G" by (rule factors_closed) fact
from bsf' have b'carr: "b' \<in> carrier G" by (rule factors_closed) fact
note carr = acarr bcarr a'carr b'carr ascarr bscarr
from asf' bsf' have "factors G (as @ bs) (a' \<otimes> b')"
by (rule factors_mult) fact+
with carr have abf': "wfactors G (as @ bs) (a' \<otimes> b')"
by (intro factors_wfactors) simp_all
also from b'b carr have trb: "a' \<otimes> b' \<sim> a' \<otimes> b"
by (intro mult_cong_r)
also from a'a carr have tra: "a' \<otimes> b \<sim> a \<otimes> b"
by (intro mult_cong_l)
finally show "wfactors G (as @ bs) (a \<otimes> b)"
by (simp add: carr)
qed
lemma (in comm_monoid) factors_dividesI:
assumes "factors G fs a"
and "f \<in> set fs"
and "set fs \<subseteq> carrier G"
shows "f divides a"
using assms by (fast elim: factorsE intro: multlist_dividesI)
lemma (in comm_monoid) wfactors_dividesI:
assumes p: "wfactors G fs a"
and fscarr: "set fs \<subseteq> carrier G" and acarr: "a \<in> carrier G"
and f: "f \<in> set fs"
shows "f divides a"
using wfactors_factors[OF p fscarr]
proof clarsimp
fix a'
assume fsa': "factors G fs a'" and a'a: "a' \<sim> a"
with fscarr have a'carr: "a' \<in> carrier G"
by (simp add: factors_closed)
from fsa' fscarr f have "f divides a'"
by (fast intro: factors_dividesI)
also note a'a
finally show "f divides a"
by (simp add: f fscarr[THEN subsetD] acarr a'carr)
qed
subsubsection \<open>Factorial monoids and wfactors\<close>
lemma (in comm_monoid_cancel) factorial_monoidI:
assumes wfactors_exists: "\<And>a. \<lbrakk> a \<in> carrier G; a \<notin> Units G \<rbrakk> \<Longrightarrow> \<exists>fs. set fs \<subseteq> carrier G \<and> wfactors G fs a"
and wfactors_unique:
"\<And>a fs fs'. \<lbrakk>a \<in> carrier G; set fs \<subseteq> carrier G; set fs' \<subseteq> carrier G;
wfactors G fs a; wfactors G fs' a\<rbrakk> \<Longrightarrow> essentially_equal G fs fs'"
shows "factorial_monoid G"
proof
fix a
assume acarr: "a \<in> carrier G" and anunit: "a \<notin> Units G"
from wfactors_exists[OF acarr anunit]
obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by blast
from wfactors_factors [OF afs ascarr] obtain a' where afs': "factors G as a'" and a'a: "a' \<sim> a"
by blast
from afs' ascarr have a'carr: "a' \<in> carrier G"
by fast
have a'nunit: "a' \<notin> Units G"
proof clarify
assume "a' \<in> Units G"
also note a'a
finally have "a \<in> Units G" by (simp add: acarr)
with anunit show False ..
qed
from a'carr acarr a'a obtain u where uunit: "u \<in> Units G" and a': "a' = a \<otimes> u"
by (blast elim: associatedE2)
note [simp] = acarr Units_closed[OF uunit] Units_inv_closed[OF uunit]
have "a = a \<otimes> \<one>" by simp
also have "\<dots> = a \<otimes> (u \<otimes> inv u)" by (simp add: uunit)
also have "\<dots> = a' \<otimes> inv u" by (simp add: m_assoc[symmetric] a'[symmetric])
finally have a: "a = a' \<otimes> inv u" .
from ascarr uunit have cr: "set (as[0:=(as!0 \<otimes> inv u)]) \<subseteq> carrier G"
by (cases as) auto
from afs' uunit a'nunit acarr ascarr have "factors G (as[0:=(as!0 \<otimes> inv u)]) a"
by (simp add: a factors_cong_unit)
with cr show "\<exists>fs. set fs \<subseteq> carrier G \<and> factors G fs a"
by fast
qed (blast intro: factors_wfactors wfactors_unique)
subsection \<open>Factorizations as Multisets\<close>
text \<open>Gives useful operations like intersection\<close>
(* FIXME: use class_of x instead of closure_of {x} *)
abbreviation "assocs G x \<equiv> eq_closure_of (division_rel G) {x}"
definition "fmset G as = mset (map (\<lambda>a. assocs G a) as)"
text \<open>Helper lemmas\<close>
lemma (in monoid) assocs_repr_independence:
assumes "y \<in> assocs G x" "x \<in> carrier G"
shows "assocs G x = assocs G y"
using assms
by (simp add: eq_closure_of_def elem_def) (use associated_sym associated_trans in \<open>blast+\<close>)
lemma (in monoid) assocs_self:
assumes "x \<in> carrier G"
shows "x \<in> assocs G x"
using assms by (fastforce intro: closure_ofI2)
lemma (in monoid) assocs_repr_independenceD:
assumes repr: "assocs G x = assocs G y" and ycarr: "y \<in> carrier G"
shows "y \<in> assocs G x"
unfolding repr using ycarr by (intro assocs_self)
lemma (in comm_monoid) assocs_assoc:
assumes "a \<in> assocs G b" "b \<in> carrier G"
shows "a \<sim> b"
using assms by (elim closure_ofE2) simp
lemmas (in comm_monoid) assocs_eqD = assocs_repr_independenceD[THEN assocs_assoc]
subsubsection \<open>Comparing multisets\<close>
lemma (in monoid) fmset_perm_cong:
assumes prm: "as <~~> bs"
shows "fmset G as = fmset G bs"
using perm_map[OF prm] unfolding mset_eq_perm fmset_def by blast
lemma (in comm_monoid_cancel) eqc_listassoc_cong:
assumes "as [\<sim>] bs" and "set as \<subseteq> carrier G" and "set bs \<subseteq> carrier G"
shows "map (assocs G) as = map (assocs G) bs"
using assms
proof (induction as arbitrary: bs)
case Nil
then show ?case by simp
next
case (Cons a as)
then show ?case
proof (clarsimp simp add: Cons_eq_map_conv list_all2_Cons1)
fix z zs
assume zzs: "a \<in> carrier G" "set as \<subseteq> carrier G" "bs = z # zs" "a \<sim> z"
"as [\<sim>] zs" "z \<in> carrier G" "set zs \<subseteq> carrier G"
then show "assocs G a = assocs G z"
apply (simp add: eq_closure_of_def elem_def)
using \<open>a \<in> carrier G\<close> \<open>z \<in> carrier G\<close> \<open>a \<sim> z\<close> associated_sym associated_trans by blast+
qed
qed
lemma (in comm_monoid_cancel) fmset_listassoc_cong:
assumes "as [\<sim>] bs"
and "set as \<subseteq> carrier G" and "set bs \<subseteq> carrier G"
shows "fmset G as = fmset G bs"
using assms unfolding fmset_def by (simp add: eqc_listassoc_cong)
lemma (in comm_monoid_cancel) ee_fmset:
assumes ee: "essentially_equal G as bs"
and ascarr: "set as \<subseteq> carrier G" and bscarr: "set bs \<subseteq> carrier G"
shows "fmset G as = fmset G bs"
using ee
proof (elim essentially_equalE)
fix as'
assume prm: "as <~~> as'"
from prm ascarr have as'carr: "set as' \<subseteq> carrier G"
by (rule perm_closed)
from prm have "fmset G as = fmset G as'"
by (rule fmset_perm_cong)
also assume "as' [\<sim>] bs"
with as'carr bscarr have "fmset G as' = fmset G bs"
by (simp add: fmset_listassoc_cong)
finally show "fmset G as = fmset G bs" .
qed
lemma (in monoid_cancel) fmset_ee_aux:
assumes "cas <~~> cbs" "cas = map (assocs G) as" "cbs = map (assocs G) bs"
shows "\<exists>as'. as <~~> as' \<and> map (assocs G) as' = cbs"
using assms
proof (induction cas cbs arbitrary: as bs rule: perm.induct)
case (Cons xs ys z)
then show ?case
by (clarsimp simp add: map_eq_Cons_conv) blast
next
case (trans xs ys zs)
then obtain as' where " as <~~> as' \<and> map (assocs G) as' = ys"
by (metis (no_types, lifting) ex_map_conv mset_eq_perm set_mset_mset)
then show ?case
using trans.IH(2) trans.prems(2) by blast
qed auto
lemma (in comm_monoid_cancel) fmset_ee:
assumes mset: "fmset G as = fmset G bs"
and ascarr: "set as \<subseteq> carrier G" and bscarr: "set bs \<subseteq> carrier G"
shows "essentially_equal G as bs"
proof -
from mset have "map (assocs G) as <~~> map (assocs G) bs"
by (simp add: fmset_def mset_eq_perm del: mset_map)
then obtain as' where tp: "as <~~> as'" and tm: "map (assocs G) as' = map (assocs G) bs"
using fmset_ee_aux by blast
with ascarr have as'carr: "set as' \<subseteq> carrier G"
using perm_closed by blast
from tm as'carr[THEN subsetD] bscarr[THEN subsetD] have "as' [\<sim>] bs"
by (induct as' arbitrary: bs) (simp, fastforce dest: assocs_eqD[THEN associated_sym])
with tp show "essentially_equal G as bs"
by (fast intro: essentially_equalI)
qed
lemma (in comm_monoid_cancel) ee_is_fmset:
assumes "set as \<subseteq> carrier G" and "set bs \<subseteq> carrier G"
shows "essentially_equal G as bs = (fmset G as = fmset G bs)"
using assms by (fast intro: ee_fmset fmset_ee)
subsubsection \<open>Interpreting multisets as factorizations\<close>
lemma (in monoid) mset_fmsetEx:
assumes elems: "\<And>X. X \<in> set_mset Cs \<Longrightarrow> \<exists>x. P x \<and> X = assocs G x"
shows "\<exists>cs. (\<forall>c \<in> set cs. P c) \<and> fmset G cs = Cs"
proof -
from surjE[OF surj_mset] obtain Cs' where Cs: "Cs = mset Cs'"
by blast
have "\<exists>cs. (\<forall>c \<in> set cs. P c) \<and> mset (map (assocs G) cs) = Cs"
using elems unfolding Cs
proof (induction Cs')
case (Cons a Cs')
then obtain c cs where csP: "\<forall>x\<in>set cs. P x" and mset: "mset (map (assocs G) cs) = mset Cs'"
and cP: "P c" and a: "a = assocs G c"
by force
then have tP: "\<forall>x\<in>set (c#cs). P x"
by simp
show ?case
using tP mset a by fastforce
qed auto
then show ?thesis by (simp add: fmset_def)
qed
lemma (in monoid) mset_wfactorsEx:
assumes elems: "\<And>X. X \<in> set_mset Cs \<Longrightarrow> \<exists>x. (x \<in> carrier G \<and> irreducible G x) \<and> X = assocs G x"
shows "\<exists>c cs. c \<in> carrier G \<and> set cs \<subseteq> carrier G \<and> wfactors G cs c \<and> fmset G cs = Cs"
proof -
have "\<exists>cs. (\<forall>c\<in>set cs. c \<in> carrier G \<and> irreducible G c) \<and> fmset G cs = Cs"
by (intro mset_fmsetEx, rule elems)
then obtain cs where p[rule_format]: "\<forall>c\<in>set cs. c \<in> carrier G \<and> irreducible G c"
and Cs[symmetric]: "fmset G cs = Cs" by auto
from p have cscarr: "set cs \<subseteq> carrier G" by fast
from p have "\<exists>c. c \<in> carrier G \<and> wfactors G cs c"
by (intro wfactors_prod_exists) auto
then obtain c where ccarr: "c \<in> carrier G" and cfs: "wfactors G cs c" by auto
with cscarr Cs show ?thesis by fast
qed
subsubsection \<open>Multiplication on multisets\<close>
lemma (in factorial_monoid) mult_wfactors_fmset:
assumes afs: "wfactors G as a"
and bfs: "wfactors G bs b"
and cfs: "wfactors G cs (a \<otimes> b)"
and carr: "a \<in> carrier G" "b \<in> carrier G"
"set as \<subseteq> carrier G" "set bs \<subseteq> carrier G" "set cs \<subseteq> carrier G"
shows "fmset G cs = fmset G as + fmset G bs"
proof -
from assms have "wfactors G (as @ bs) (a \<otimes> b)"
by (intro wfactors_mult)
with carr cfs have "essentially_equal G cs (as@bs)"
by (intro ee_wfactorsI[of "a\<otimes>b" "a\<otimes>b"]) simp_all
with carr have "fmset G cs = fmset G (as@bs)"
by (intro ee_fmset) simp_all
also have "fmset G (as@bs) = fmset G as + fmset G bs"
by (simp add: fmset_def)
finally show "fmset G cs = fmset G as + fmset G bs" .
qed
lemma (in factorial_monoid) mult_factors_fmset:
assumes afs: "factors G as a"
and bfs: "factors G bs b"
and cfs: "factors G cs (a \<otimes> b)"
and "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G" "set cs \<subseteq> carrier G"
shows "fmset G cs = fmset G as + fmset G bs"
using assms by (blast intro: factors_wfactors mult_wfactors_fmset)
lemma (in comm_monoid_cancel) fmset_wfactors_mult:
assumes mset: "fmset G cs = fmset G as + fmset G bs"
and carr: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
"set as \<subseteq> carrier G" "set bs \<subseteq> carrier G" "set cs \<subseteq> carrier G"
and fs: "wfactors G as a" "wfactors G bs b" "wfactors G cs c"
shows "c \<sim> a \<otimes> b"
proof -
from carr fs have m: "wfactors G (as @ bs) (a \<otimes> b)"
by (intro wfactors_mult)
from mset have "fmset G cs = fmset G (as@bs)"
by (simp add: fmset_def)
then have "essentially_equal G cs (as@bs)"
by (rule fmset_ee) (simp_all add: carr)
then show "c \<sim> a \<otimes> b"
by (rule ee_wfactorsD[of "cs" "as@bs"]) (simp_all add: assms m)
qed
subsubsection \<open>Divisibility on multisets\<close>
lemma (in factorial_monoid) divides_fmsubset:
assumes ab: "a divides b"
and afs: "wfactors G as a"
and bfs: "wfactors G bs b"
and carr: "a \<in> carrier G" "b \<in> carrier G" "set as \<subseteq> carrier G" "set bs \<subseteq> carrier G"
shows "fmset G as \<subseteq># fmset G bs"
using ab
proof (elim dividesE)
fix c
assume ccarr: "c \<in> carrier G"
from wfactors_exist [OF this]
obtain cs where cscarr: "set cs \<subseteq> carrier G" and cfs: "wfactors G cs c"
by blast
note carr = carr ccarr cscarr
assume "b = a \<otimes> c"
with afs bfs cfs carr have "fmset G bs = fmset G as + fmset G cs"
by (intro mult_wfactors_fmset[OF afs cfs]) simp_all
then show ?thesis by simp
qed
lemma (in comm_monoid_cancel) fmsubset_divides:
assumes msubset: "fmset G as \<subseteq># fmset G bs"
and afs: "wfactors G as a"
and bfs: "wfactors G bs b"
and acarr: "a \<in> carrier G"
and bcarr: "b \<in> carrier G"
and ascarr: "set as \<subseteq> carrier G"
and bscarr: "set bs \<subseteq> carrier G"
shows "a divides b"
proof -
from afs have airr: "\<forall>a \<in> set as. irreducible G a" by (fast elim: wfactorsE)
from bfs have birr: "\<forall>b \<in> set bs. irreducible G b" by (fast elim: wfactorsE)
have "\<exists>c cs. c \<in> carrier G \<and> set cs \<subseteq> carrier G \<and> wfactors G cs c \<and> fmset G cs = fmset G bs - fmset G as"
proof (intro mset_wfactorsEx, simp)
fix X
assume "X \<in># fmset G bs - fmset G as"
then have "X \<in># fmset G bs" by (rule in_diffD)
then have "X \<in> set (map (assocs G) bs)" by (simp add: fmset_def)
then have "\<exists>x. x \<in> set bs \<and> X = assocs G x" by (induct bs) auto
then obtain x where xbs: "x \<in> set bs" and X: "X = assocs G x" by auto
with bscarr have xcarr: "x \<in> carrier G" by fast
from xbs birr have xirr: "irreducible G x" by simp
from xcarr and xirr and X show "\<exists>x. x \<in> carrier G \<and> irreducible G x \<and> X = assocs G x"
by fast
qed
then obtain c cs
where ccarr: "c \<in> carrier G"
and cscarr: "set cs \<subseteq> carrier G"
and csf: "wfactors G cs c"
and csmset: "fmset G cs = fmset G bs - fmset G as" by auto
from csmset msubset
have "fmset G bs = fmset G as + fmset G cs"
by (simp add: multiset_eq_iff subseteq_mset_def)
then have basc: "b \<sim> a \<otimes> c"
by (rule fmset_wfactors_mult) fact+
then show ?thesis
proof (elim associatedE2)
fix u
assume "u \<in> Units G" "b = a \<otimes> c \<otimes> u"
with acarr ccarr show "a divides b"
by (fast intro: dividesI[of "c \<otimes> u"] m_assoc)
qed (simp_all add: acarr bcarr ccarr)
qed
lemma (in factorial_monoid) divides_as_fmsubset:
assumes "wfactors G as a"
and "wfactors G bs b"
and "a \<in> carrier G"
and "b \<in> carrier G"
and "set as \<subseteq> carrier G"
and "set bs \<subseteq> carrier G"
shows "a divides b = (fmset G as \<subseteq># fmset G bs)"
using assms
by (blast intro: divides_fmsubset fmsubset_divides)
text \<open>Proper factors on multisets\<close>
lemma (in factorial_monoid) fmset_properfactor:
assumes asubb: "fmset G as \<subseteq># fmset G bs"
and anb: "fmset G as \<noteq> fmset G bs"
and "wfactors G as a"
and "wfactors G bs b"
and "a \<in> carrier G"
and "b \<in> carrier G"
and "set as \<subseteq> carrier G"
and "set bs \<subseteq> carrier G"
shows "properfactor G a b"
proof (rule properfactorI)
show "a divides b"
using assms asubb fmsubset_divides by blast
show "\<not> b divides a"
by (meson anb assms asubb factorial_monoid.divides_fmsubset factorial_monoid_axioms subset_mset.antisym)
qed
lemma (in factorial_monoid) properfactor_fmset:
assumes "properfactor G a b"
and "wfactors G as a"
and "wfactors G bs b"
and "a \<in> carrier G"
and "b \<in> carrier G"
and "set as \<subseteq> carrier G"
and "set bs \<subseteq> carrier G"
shows "fmset G as \<subseteq># fmset G bs"
using assms
by (meson divides_as_fmsubset properfactor_divides)
lemma (in factorial_monoid) properfactor_fmset_ne:
assumes pf: "properfactor G a b"
and "wfactors G as a"
and "wfactors G bs b"
and "a \<in> carrier G"
and "b \<in> carrier G"
and "set as \<subseteq> carrier G"
and "set bs \<subseteq> carrier G"
shows "fmset G as \<noteq> fmset G bs"
using properfactorE [OF pf] assms divides_as_fmsubset by force
subsection \<open>Irreducible Elements are Prime\<close>
lemma (in factorial_monoid) irreducible_prime:
assumes pirr: "irreducible G p" and pcarr: "p \<in> carrier G"
shows "prime G p"
using pirr
proof (elim irreducibleE, intro primeI)
fix a b
assume acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G"
and pdvdab: "p divides (a \<otimes> b)"
and pnunit: "p \<notin> Units G"
assume irreduc[rule_format]:
"\<forall>b. b \<in> carrier G \<and> properfactor G b p \<longrightarrow> b \<in> Units G"
from pdvdab obtain c where ccarr: "c \<in> carrier G" and abpc: "a \<otimes> b = p \<otimes> c"
by (rule dividesE)
obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
using wfactors_exist [OF acarr] by blast
obtain bs where bscarr: "set bs \<subseteq> carrier G" and bfs: "wfactors G bs b"
using wfactors_exist [OF bcarr] by blast
obtain cs where cscarr: "set cs \<subseteq> carrier G" and cfs: "wfactors G cs c"
using wfactors_exist [OF ccarr] by blast
note carr[simp] = pcarr acarr bcarr ccarr ascarr bscarr cscarr
from pirr cfs abpc have "wfactors G (p # cs) (a \<otimes> b)"
by (simp add: wfactors_mult_single)
moreover have "wfactors G (as @ bs) (a \<otimes> b)"
by (rule wfactors_mult [OF afs bfs]) fact+
ultimately have "essentially_equal G (p # cs) (as @ bs)"
by (rule wfactors_unique) simp+
then obtain ds where "p # cs <~~> ds" and dsassoc: "ds [\<sim>] (as @ bs)"
by (fast elim: essentially_equalE)
then have "p \<in> set ds"
by (simp add: perm_set_eq[symmetric])
with dsassoc obtain p' where "p' \<in> set (as@bs)" and pp': "p \<sim> p'"
unfolding list_all2_conv_all_nth set_conv_nth by force
then consider "p' \<in> set as" | "p' \<in> set bs" by auto
then show "p divides a \<or> p divides b"
using afs bfs divides_cong_l pp' wfactors_dividesI
by (meson acarr ascarr bcarr bscarr pcarr)
qed
\<comment> \<open>A version using \<^const>\<open>factors\<close>, more complicated\<close>
lemma (in factorial_monoid) factors_irreducible_prime:
assumes pirr: "irreducible G p" and pcarr: "p \<in> carrier G"
shows "prime G p"
proof (rule primeI)
show "p \<notin> Units G"
by (meson irreducibleE pirr)
have irreduc: "\<And>b. \<lbrakk>b \<in> carrier G; properfactor G b p\<rbrakk> \<Longrightarrow> b \<in> Units G"
using pirr by (auto simp: irreducible_def)
show "p divides a \<or> p divides b"
if acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G" and pdvdab: "p divides (a \<otimes> b)" for a b
proof -
from pdvdab obtain c where ccarr: "c \<in> carrier G" and abpc: "a \<otimes> b = p \<otimes> c"
by (rule dividesE)
note [simp] = pcarr acarr bcarr ccarr
show "p divides a \<or> p divides b"
proof (cases "a \<in> Units G")
case True
then have "p divides b"
by (metis acarr associatedI2' associated_def bcarr divides_trans m_comm pcarr pdvdab)
then show ?thesis ..
next
case anunit: False
show ?thesis
proof (cases "b \<in> Units G")
case True
then have "p divides a"
by (meson acarr bcarr divides_unit irreducible_prime pcarr pdvdab pirr prime_def)
then show ?thesis ..
next
case bnunit: False
then have cnunit: "c \<notin> Units G"
by (metis abpc acarr anunit bcarr ccarr irreducible_prodE irreducible_prod_rI pcarr pirr)
then have abnunit: "a \<otimes> b \<notin> Units G"
using acarr anunit bcarr unit_factor by blast
obtain as where ascarr: "set as \<subseteq> carrier G" and afac: "factors G as a"
using factors_exist [OF acarr anunit] by blast
obtain bs where bscarr: "set bs \<subseteq> carrier G" and bfac: "factors G bs b"
using factors_exist [OF bcarr bnunit] by blast
obtain cs where cscarr: "set cs \<subseteq> carrier G" and cfac: "factors G cs c"
using factors_exist [OF ccarr cnunit] by auto
note [simp] = ascarr bscarr cscarr
from pirr cfac abpc have abfac': "factors G (p # cs) (a \<otimes> b)"
by (simp add: factors_mult_single)
from afac and bfac have "factors G (as @ bs) (a \<otimes> b)"
by (rule factors_mult) fact+
with abfac' have "essentially_equal G (p # cs) (as @ bs)"
using abnunit factors_unique by auto
then obtain ds where "p # cs <~~> ds" and dsassoc: "ds [\<sim>] (as @ bs)"
by (fast elim: essentially_equalE)
then have "p \<in> set ds"
by (simp add: perm_set_eq[symmetric])
with dsassoc obtain p' where "p' \<in> set (as@bs)" and pp': "p \<sim> p'"
unfolding list_all2_conv_all_nth set_conv_nth by force
then consider "p' \<in> set as" | "p' \<in> set bs" by auto
then show "p divides a \<or> p divides b"
by (meson afac bfac divides_cong_l factors_dividesI pp' ascarr bscarr pcarr)
qed
qed
qed
qed
subsection \<open>Greatest Common Divisors and Lowest Common Multiples\<close>
subsubsection \<open>Definitions\<close>
definition isgcd :: "[('a,_) monoid_scheme, 'a, 'a, 'a] \<Rightarrow> bool" ("(_ gcdof\<index> _ _)" [81,81,81] 80)
where "x gcdof\<^bsub>G\<^esub> a b \<longleftrightarrow> x divides\<^bsub>G\<^esub> a \<and> x divides\<^bsub>G\<^esub> b \<and>
(\<forall>y\<in>carrier G. (y divides\<^bsub>G\<^esub> a \<and> y divides\<^bsub>G\<^esub> b \<longrightarrow> y divides\<^bsub>G\<^esub> x))"
definition islcm :: "[_, 'a, 'a, 'a] \<Rightarrow> bool" ("(_ lcmof\<index> _ _)" [81,81,81] 80)
where "x lcmof\<^bsub>G\<^esub> a b \<longleftrightarrow> a divides\<^bsub>G\<^esub> x \<and> b divides\<^bsub>G\<^esub> x \<and>
(\<forall>y\<in>carrier G. (a divides\<^bsub>G\<^esub> y \<and> b divides\<^bsub>G\<^esub> y \<longrightarrow> x divides\<^bsub>G\<^esub> y))"
definition somegcd :: "('a,_) monoid_scheme \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'a"
where "somegcd G a b = (SOME x. x \<in> carrier G \<and> x gcdof\<^bsub>G\<^esub> a b)"
definition somelcm :: "('a,_) monoid_scheme \<Rightarrow> 'a \<Rightarrow> 'a \<Rightarrow> 'a"
where "somelcm G a b = (SOME x. x \<in> carrier G \<and> x lcmof\<^bsub>G\<^esub> a b)"
definition "SomeGcd G A = Lattice.inf (division_rel G) A"
locale gcd_condition_monoid = comm_monoid_cancel +
assumes gcdof_exists: "\<lbrakk>a \<in> carrier G; b \<in> carrier G\<rbrakk> \<Longrightarrow> \<exists>c. c \<in> carrier G \<and> c gcdof a b"
locale primeness_condition_monoid = comm_monoid_cancel +
assumes irreducible_prime: "\<lbrakk>a \<in> carrier G; irreducible G a\<rbrakk> \<Longrightarrow> prime G a"
locale divisor_chain_condition_monoid = comm_monoid_cancel +
assumes division_wellfounded: "wf {(x, y). x \<in> carrier G \<and> y \<in> carrier G \<and> properfactor G x y}"
subsubsection \<open>Connections to \texttt{Lattice.thy}\<close>
lemma gcdof_greatestLower:
fixes G (structure)
assumes carr[simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "(x \<in> carrier G \<and> x gcdof a b) = greatest (division_rel G) x (Lower (division_rel G) {a, b})"
by (auto simp: isgcd_def greatest_def Lower_def elem_def)
lemma lcmof_leastUpper:
fixes G (structure)
assumes carr[simp]: "a \<in> carrier G" "b \<in> carrier G"
shows "(x \<in> carrier G \<and> x lcmof a b) = least (division_rel G) x (Upper (division_rel G) {a, b})"
by (auto simp: islcm_def least_def Upper_def elem_def)
lemma somegcd_meet:
fixes G (structure)
assumes carr: "a \<in> carrier G" "b \<in> carrier G"
shows "somegcd G a b = meet (division_rel G) a b"
by (simp add: somegcd_def meet_def inf_def gcdof_greatestLower[OF carr])
lemma (in monoid) isgcd_divides_l:
assumes "a divides b"
and "a \<in> carrier G" "b \<in> carrier G"
shows "a gcdof a b"
using assms unfolding isgcd_def by fast
lemma (in monoid) isgcd_divides_r:
assumes "b divides a"
and "a \<in> carrier G" "b \<in> carrier G"
shows "b gcdof a b"
using assms unfolding isgcd_def by fast
subsubsection \<open>Existence of gcd and lcm\<close>
lemma (in factorial_monoid) gcdof_exists:
assumes acarr: "a \<in> carrier G"
and bcarr: "b \<in> carrier G"
shows "\<exists>c. c \<in> carrier G \<and> c gcdof a b"
proof -
from wfactors_exist [OF acarr]
obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by blast
from afs have airr: "\<forall>a \<in> set as. irreducible G a"
by (fast elim: wfactorsE)
from wfactors_exist [OF bcarr]
obtain bs where bscarr: "set bs \<subseteq> carrier G" and bfs: "wfactors G bs b"
by blast
from bfs have birr: "\<forall>b \<in> set bs. irreducible G b"
by (fast elim: wfactorsE)
have "\<exists>c cs. c \<in> carrier G \<and> set cs \<subseteq> carrier G \<and> wfactors G cs c \<and>
fmset G cs = fmset G as \<inter># fmset G bs"
proof (intro mset_wfactorsEx)
fix X
assume "X \<in># fmset G as \<inter># fmset G bs"
then have "X \<in># fmset G as" by simp
then have "X \<in> set (map (assocs G) as)"
by (simp add: fmset_def)
then have "\<exists>x. X = assocs G x \<and> x \<in> set as"
by (induct as) auto
then obtain x where X: "X = assocs G x" and xas: "x \<in> set as"
by blast
with ascarr have xcarr: "x \<in> carrier G"
by blast
from xas airr have xirr: "irreducible G x"
by simp
from xcarr and xirr and X show "\<exists>x. (x \<in> carrier G \<and> irreducible G x) \<and> X = assocs G x"
by blast
qed
then obtain c cs
where ccarr: "c \<in> carrier G"
and cscarr: "set cs \<subseteq> carrier G"
and csirr: "wfactors G cs c"
and csmset: "fmset G cs = fmset G as \<inter># fmset G bs"
by auto
have "c gcdof a b"
proof (simp add: isgcd_def, safe)
from csmset
have "fmset G cs \<subseteq># fmset G as"
by (simp add: multiset_inter_def subset_mset_def)
then show "c divides a" by (rule fmsubset_divides) fact+
next
from csmset have "fmset G cs \<subseteq># fmset G bs"
by (simp add: multiset_inter_def subseteq_mset_def, force)
then show "c divides b"
by (rule fmsubset_divides) fact+
next
fix y
assume "y \<in> carrier G"
from wfactors_exist [OF this]
obtain ys where yscarr: "set ys \<subseteq> carrier G" and yfs: "wfactors G ys y"
by blast
assume "y divides a"
then have ya: "fmset G ys \<subseteq># fmset G as"
by (rule divides_fmsubset) fact+
assume "y divides b"
then have yb: "fmset G ys \<subseteq># fmset G bs"
by (rule divides_fmsubset) fact+
from ya yb csmset have "fmset G ys \<subseteq># fmset G cs"
by (simp add: subset_mset_def)
then show "y divides c"
by (rule fmsubset_divides) fact+
qed
with ccarr show "\<exists>c. c \<in> carrier G \<and> c gcdof a b"
by fast
qed
lemma (in factorial_monoid) lcmof_exists:
assumes acarr: "a \<in> carrier G"
and bcarr: "b \<in> carrier G"
shows "\<exists>c. c \<in> carrier G \<and> c lcmof a b"
proof -
from wfactors_exist [OF acarr]
obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by blast
from afs have airr: "\<forall>a \<in> set as. irreducible G a"
by (fast elim: wfactorsE)
from wfactors_exist [OF bcarr]
obtain bs where bscarr: "set bs \<subseteq> carrier G" and bfs: "wfactors G bs b"
by blast
from bfs have birr: "\<forall>b \<in> set bs. irreducible G b"
by (fast elim: wfactorsE)
have "\<exists>c cs. c \<in> carrier G \<and> set cs \<subseteq> carrier G \<and> wfactors G cs c \<and>
fmset G cs = (fmset G as - fmset G bs) + fmset G bs"
proof (intro mset_wfactorsEx)
fix X
assume "X \<in># (fmset G as - fmset G bs) + fmset G bs"
then have "X \<in># fmset G as \<or> X \<in># fmset G bs"
by (auto dest: in_diffD)
then consider "X \<in> set_mset (fmset G as)" | "X \<in> set_mset (fmset G bs)"
by fast
then show "\<exists>x. (x \<in> carrier G \<and> irreducible G x) \<and> X = assocs G x"
proof cases
case 1
then have "X \<in> set (map (assocs G) as)" by (simp add: fmset_def)
then have "\<exists>x. x \<in> set as \<and> X = assocs G x" by (induct as) auto
then obtain x where xas: "x \<in> set as" and X: "X = assocs G x" by auto
with ascarr have xcarr: "x \<in> carrier G" by fast
from xas airr have xirr: "irreducible G x" by simp
from xcarr and xirr and X show ?thesis by fast
next
case 2
then have "X \<in> set (map (assocs G) bs)" by (simp add: fmset_def)
then have "\<exists>x. x \<in> set bs \<and> X = assocs G x" by (induct as) auto
then obtain x where xbs: "x \<in> set bs" and X: "X = assocs G x" by auto
with bscarr have xcarr: "x \<in> carrier G" by fast
from xbs birr have xirr: "irreducible G x" by simp
from xcarr and xirr and X show ?thesis by fast
qed
qed
then obtain c cs
where ccarr: "c \<in> carrier G"
and cscarr: "set cs \<subseteq> carrier G"
and csirr: "wfactors G cs c"
and csmset: "fmset G cs = fmset G as - fmset G bs + fmset G bs"
by auto
have "c lcmof a b"
proof (simp add: islcm_def, safe)
from csmset have "fmset G as \<subseteq># fmset G cs"
by (simp add: subseteq_mset_def, force)
then show "a divides c"
by (rule fmsubset_divides) fact+
next
from csmset have "fmset G bs \<subseteq># fmset G cs"
by (simp add: subset_mset_def)
then show "b divides c"
by (rule fmsubset_divides) fact+
next
fix y
assume "y \<in> carrier G"
from wfactors_exist [OF this]
obtain ys where yscarr: "set ys \<subseteq> carrier G" and yfs: "wfactors G ys y"
by blast
assume "a divides y"
then have ya: "fmset G as \<subseteq># fmset G ys"
by (rule divides_fmsubset) fact+
assume "b divides y"
then have yb: "fmset G bs \<subseteq># fmset G ys"
by (rule divides_fmsubset) fact+
from ya yb csmset have "fmset G cs \<subseteq># fmset G ys"
using subset_eq_diff_conv subset_mset.le_diff_conv2 by fastforce
then show "c divides y"
by (rule fmsubset_divides) fact+
qed
with ccarr show "\<exists>c. c \<in> carrier G \<and> c lcmof a b"
by fast
qed
subsection \<open>Conditions for Factoriality\<close>
subsubsection \<open>Gcd condition\<close>
lemma (in gcd_condition_monoid) division_weak_lower_semilattice [simp]:
"weak_lower_semilattice (division_rel G)"
proof -
interpret weak_partial_order "division_rel G" ..
show ?thesis
proof (unfold_locales, simp_all)
fix x y
assume carr: "x \<in> carrier G" "y \<in> carrier G"
from gcdof_exists [OF this] obtain z where zcarr: "z \<in> carrier G" and isgcd: "z gcdof x y"
by blast
with carr have "greatest (division_rel G) z (Lower (division_rel G) {x, y})"
by (subst gcdof_greatestLower[symmetric], simp+)
then show "\<exists>z. greatest (division_rel G) z (Lower (division_rel G) {x, y})"
by fast
qed
qed
lemma (in gcd_condition_monoid) gcdof_cong_l:
assumes "a' \<sim> a" "a gcdof b c" "a' \<in> carrier G" and carr': "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "a' gcdof b c"
proof -
interpret weak_lower_semilattice "division_rel G" by simp
have "is_glb (division_rel G) a' {b, c}"
by (subst greatest_Lower_cong_l[of _ a]) (simp_all add: assms gcdof_greatestLower[symmetric])
then have "a' \<in> carrier G \<and> a' gcdof b c"
by (simp add: gcdof_greatestLower carr')
then show ?thesis ..
qed
lemma (in gcd_condition_monoid) gcd_closed [simp]:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "somegcd G a b \<in> carrier G"
proof -
interpret weak_lower_semilattice "division_rel G" by simp
show ?thesis
using assms meet_closed by (simp add: somegcd_meet)
qed
lemma (in gcd_condition_monoid) gcd_isgcd:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "(somegcd G a b) gcdof a b"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
from assms have "somegcd G a b \<in> carrier G \<and> (somegcd G a b) gcdof a b"
by (simp add: gcdof_greatestLower inf_of_two_greatest meet_def somegcd_meet)
then show "(somegcd G a b) gcdof a b"
by simp
qed
lemma (in gcd_condition_monoid) gcd_exists:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "\<exists>x\<in>carrier G. x = somegcd G a b"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
by (metis assms gcd_closed)
qed
lemma (in gcd_condition_monoid) gcd_divides_l:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "(somegcd G a b) divides a"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
by (metis assms gcd_isgcd isgcd_def)
qed
lemma (in gcd_condition_monoid) gcd_divides_r:
assumes "a \<in> carrier G" "b \<in> carrier G"
shows "(somegcd G a b) divides b"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
by (metis assms gcd_isgcd isgcd_def)
qed
lemma (in gcd_condition_monoid) gcd_divides:
assumes "z divides x" "z divides y"
and L: "x \<in> carrier G" "y \<in> carrier G" "z \<in> carrier G"
shows "z divides (somegcd G x y)"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
by (metis gcd_isgcd isgcd_def assms)
qed
lemma (in gcd_condition_monoid) gcd_cong_l:
assumes "x \<sim> x'" "x \<in> carrier G" "x' \<in> carrier G" "y \<in> carrier G"
shows "somegcd G x y \<sim> somegcd G x' y"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
using somegcd_meet assms
by (metis eq_object.select_convs(1) meet_cong_l partial_object.select_convs(1))
qed
lemma (in gcd_condition_monoid) gcd_cong_r:
assumes "y \<sim> y'" "x \<in> carrier G" "y \<in> carrier G" "y' \<in> carrier G"
shows "somegcd G x y \<sim> somegcd G x y'"
proof -
interpret weak_lower_semilattice "division_rel G" by simp
show ?thesis
by (meson associated_def assms gcd_closed gcd_divides gcd_divides_l gcd_divides_r monoid.divides_trans monoid_axioms)
qed
lemma (in gcd_condition_monoid) gcdI:
assumes dvd: "a divides b" "a divides c"
and others: "\<And>y. \<lbrakk>y\<in>carrier G; y divides b; y divides c\<rbrakk> \<Longrightarrow> y divides a"
and acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G" and ccarr: "c \<in> carrier G"
shows "a \<sim> somegcd G b c"
proof -
have "\<exists>a. a \<in> carrier G \<and> a gcdof b c"
by (simp add: bcarr ccarr gcdof_exists)
moreover have "\<And>x. x \<in> carrier G \<and> x gcdof b c \<Longrightarrow> a \<sim> x"
by (simp add: acarr associated_def dvd isgcd_def others)
ultimately show ?thesis
unfolding somegcd_def by (blast intro: someI2_ex)
qed
lemma (in gcd_condition_monoid) gcdI2:
assumes "a gcdof b c" and "a \<in> carrier G" and "b \<in> carrier G" and "c \<in> carrier G"
shows "a \<sim> somegcd G b c"
using assms unfolding isgcd_def
by (simp add: gcdI)
lemma (in gcd_condition_monoid) SomeGcd_ex:
assumes "finite A" "A \<subseteq> carrier G" "A \<noteq> {}"
shows "\<exists>x \<in> carrier G. x = SomeGcd G A"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
using finite_inf_closed by (simp add: assms SomeGcd_def)
qed
lemma (in gcd_condition_monoid) gcd_assoc:
assumes "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "somegcd G (somegcd G a b) c \<sim> somegcd G a (somegcd G b c)"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show ?thesis
unfolding associated_def
by (meson assms divides_trans gcd_divides gcd_divides_l gcd_divides_r gcd_exists)
qed
lemma (in gcd_condition_monoid) gcd_mult:
assumes acarr: "a \<in> carrier G" and bcarr: "b \<in> carrier G" and ccarr: "c \<in> carrier G"
shows "c \<otimes> somegcd G a b \<sim> somegcd G (c \<otimes> a) (c \<otimes> b)"
proof - (* following Jacobson, Basic Algebra, p.140 *)
let ?d = "somegcd G a b"
let ?e = "somegcd G (c \<otimes> a) (c \<otimes> b)"
note carr[simp] = acarr bcarr ccarr
have dcarr: "?d \<in> carrier G" by simp
have ecarr: "?e \<in> carrier G" by simp
note carr = carr dcarr ecarr
have "?d divides a" by (simp add: gcd_divides_l)
then have cd'ca: "c \<otimes> ?d divides (c \<otimes> a)" by (simp add: divides_mult_lI)
have "?d divides b" by (simp add: gcd_divides_r)
then have cd'cb: "c \<otimes> ?d divides (c \<otimes> b)" by (simp add: divides_mult_lI)
from cd'ca cd'cb have cd'e: "c \<otimes> ?d divides ?e"
by (rule gcd_divides) simp_all
then obtain u where ucarr[simp]: "u \<in> carrier G" and e_cdu: "?e = c \<otimes> ?d \<otimes> u"
by blast
note carr = carr ucarr
have "?e divides c \<otimes> a" by (rule gcd_divides_l) simp_all
then obtain x where xcarr: "x \<in> carrier G" and ca_ex: "c \<otimes> a = ?e \<otimes> x"
by blast
with e_cdu have ca_cdux: "c \<otimes> a = c \<otimes> ?d \<otimes> u \<otimes> x"
by simp
from ca_cdux xcarr have "c \<otimes> a = c \<otimes> (?d \<otimes> u \<otimes> x)"
by (simp add: m_assoc)
then have "a = ?d \<otimes> u \<otimes> x"
by (rule l_cancel[of c a]) (simp add: xcarr)+
then have du'a: "?d \<otimes> u divides a"
by (rule dividesI[OF xcarr])
have "?e divides c \<otimes> b" by (intro gcd_divides_r) simp_all
then obtain x where xcarr: "x \<in> carrier G" and cb_ex: "c \<otimes> b = ?e \<otimes> x"
by blast
with e_cdu have cb_cdux: "c \<otimes> b = c \<otimes> ?d \<otimes> u \<otimes> x"
by simp
from cb_cdux xcarr have "c \<otimes> b = c \<otimes> (?d \<otimes> u \<otimes> x)"
by (simp add: m_assoc)
with xcarr have "b = ?d \<otimes> u \<otimes> x"
by (intro l_cancel[of c b]) simp_all
then have du'b: "?d \<otimes> u divides b"
by (intro dividesI[OF xcarr])
from du'a du'b carr have du'd: "?d \<otimes> u divides ?d"
by (intro gcd_divides) simp_all
then have uunit: "u \<in> Units G"
proof (elim dividesE)
fix v
assume vcarr[simp]: "v \<in> carrier G"
assume d: "?d = ?d \<otimes> u \<otimes> v"
have "?d \<otimes> \<one> = ?d \<otimes> u \<otimes> v" by simp fact
also have "?d \<otimes> u \<otimes> v = ?d \<otimes> (u \<otimes> v)" by (simp add: m_assoc)
finally have "?d \<otimes> \<one> = ?d \<otimes> (u \<otimes> v)" .
then have i2: "\<one> = u \<otimes> v" by (rule l_cancel) simp_all
then have i1: "\<one> = v \<otimes> u" by (simp add: m_comm)
from vcarr i1[symmetric] i2[symmetric] show "u \<in> Units G"
by (auto simp: Units_def)
qed
from e_cdu uunit have "somegcd G (c \<otimes> a) (c \<otimes> b) \<sim> c \<otimes> somegcd G a b"
by (intro associatedI2[of u]) simp_all
from this[symmetric] show "c \<otimes> somegcd G a b \<sim> somegcd G (c \<otimes> a) (c \<otimes> b)"
by simp
qed
lemma (in monoid) assoc_subst:
assumes ab: "a \<sim> b"
and cP: "\<forall>a b. a \<in> carrier G \<and> b \<in> carrier G \<and> a \<sim> b
\<longrightarrow> f a \<in> carrier G \<and> f b \<in> carrier G \<and> f a \<sim> f b"
and carr: "a \<in> carrier G" "b \<in> carrier G"
shows "f a \<sim> f b"
using assms by auto
lemma (in gcd_condition_monoid) relprime_mult:
assumes abrelprime: "somegcd G a b \<sim> \<one>"
and acrelprime: "somegcd G a c \<sim> \<one>"
and carr[simp]: "a \<in> carrier G" "b \<in> carrier G" "c \<in> carrier G"
shows "somegcd G a (b \<otimes> c) \<sim> \<one>"
proof -
have "c = c \<otimes> \<one>" by simp
also from abrelprime[symmetric]
have "\<dots> \<sim> c \<otimes> somegcd G a b"
by (rule assoc_subst) (simp add: mult_cong_r)+
also have "\<dots> \<sim> somegcd G (c \<otimes> a) (c \<otimes> b)"
by (rule gcd_mult) fact+
finally have c: "c \<sim> somegcd G (c \<otimes> a) (c \<otimes> b)"
by simp
from carr have a: "a \<sim> somegcd G a (c \<otimes> a)"
by (fast intro: gcdI divides_prod_l)
have "somegcd G a (b \<otimes> c) \<sim> somegcd G a (c \<otimes> b)"
by (simp add: m_comm)
also from a have "\<dots> \<sim> somegcd G (somegcd G a (c \<otimes> a)) (c \<otimes> b)"
by (rule assoc_subst) (simp add: gcd_cong_l)+
also from gcd_assoc have "\<dots> \<sim> somegcd G a (somegcd G (c \<otimes> a) (c \<otimes> b))"
by (rule assoc_subst) simp+
also from c[symmetric] have "\<dots> \<sim> somegcd G a c"
by (rule assoc_subst) (simp add: gcd_cong_r)+
also note acrelprime
finally show "somegcd G a (b \<otimes> c) \<sim> \<one>"
by simp
qed
lemma (in gcd_condition_monoid) primeness_condition: "primeness_condition_monoid G"
proof -
have *: "p divides a \<or> p divides b"
if pcarr[simp]: "p \<in> carrier G" and acarr[simp]: "a \<in> carrier G" and bcarr[simp]: "b \<in> carrier G"
and pirr: "irreducible G p" and pdvdab: "p divides a \<otimes> b"
for p a b
proof -
from pirr have pnunit: "p \<notin> Units G"
and r: "\<And>b. \<lbrakk>b \<in> carrier G; properfactor G b p\<rbrakk> \<Longrightarrow> b \<in> Units G"
by (fast elim: irreducibleE)+
show "p divides a \<or> p divides b"
proof (rule ccontr, clarsimp)
assume npdvda: "\<not> p divides a" and npdvdb: "\<not> p divides b"
have "\<one> \<sim> somegcd G p a"
proof (intro gcdI unit_divides)
show "\<And>y. \<lbrakk>y \<in> carrier G; y divides p; y divides a\<rbrakk> \<Longrightarrow> y \<in> Units G"
by (meson divides_trans npdvda pcarr properfactorI r)
qed auto
with pcarr acarr have pa: "somegcd G p a \<sim> \<one>"
by (fast intro: associated_sym[of "\<one>"] gcd_closed)
have "\<one> \<sim> somegcd G p b"
proof (intro gcdI unit_divides)
show "\<And>y. \<lbrakk>y \<in> carrier G; y divides p; y divides b\<rbrakk> \<Longrightarrow> y \<in> Units G"
by (meson divides_trans npdvdb pcarr properfactorI r)
qed auto
with pcarr bcarr have pb: "somegcd G p b \<sim> \<one>"
by (fast intro: associated_sym[of "\<one>"] gcd_closed)
have "p \<sim> somegcd G p (a \<otimes> b)"
using pdvdab by (simp add: gcdI2 isgcd_divides_l)
also from pa pb pcarr acarr bcarr have "somegcd G p (a \<otimes> b) \<sim> \<one>"
by (rule relprime_mult)
finally have "p \<sim> \<one>"
by simp
with pcarr have "p \<in> Units G"
by (fast intro: assoc_unit_l)
with pnunit show False ..
qed
qed
show ?thesis
by unfold_locales (metis * primeI irreducibleE)
qed
sublocale gcd_condition_monoid \<subseteq> primeness_condition_monoid
by (rule primeness_condition)
subsubsection \<open>Divisor chain condition\<close>
lemma (in divisor_chain_condition_monoid) wfactors_exist:
assumes acarr: "a \<in> carrier G"
shows "\<exists>as. set as \<subseteq> carrier G \<and> wfactors G as a"
proof -
have r: "a \<in> carrier G \<Longrightarrow> (\<exists>as. set as \<subseteq> carrier G \<and> wfactors G as a)"
using division_wellfounded
proof (induction rule: wf_induct_rule)
case (less x)
then have xcarr: "x \<in> carrier G"
by auto
show ?case
proof (cases "x \<in> Units G")
case True
then show ?thesis
by (metis bot.extremum list.set(1) unit_wfactors)
next
case xnunit: False
show ?thesis
proof (cases "irreducible G x")
case True
then show ?thesis
by (rule_tac x="[x]" in exI) (simp add: wfactors_def xcarr)
next
case False
then obtain y where ycarr: "y \<in> carrier G" and ynunit: "y \<notin> Units G" and pfyx: "properfactor G y x"
by (meson irreducible_def xnunit)
obtain ys where yscarr: "set ys \<subseteq> carrier G" and yfs: "wfactors G ys y"
using less ycarr pfyx by blast
then obtain z where zcarr: "z \<in> carrier G" and x: "x = y \<otimes> z"
by (meson dividesE pfyx properfactorE2)
from zcarr ycarr have "properfactor G z x"
using m_comm properfactorI3 x ynunit by blast
with less zcarr obtain zs where zscarr: "set zs \<subseteq> carrier G" and zfs: "wfactors G zs z"
by blast
from yscarr zscarr have xscarr: "set (ys@zs) \<subseteq> carrier G"
by simp
have "wfactors G (ys@zs) (y\<otimes>z)"
using xscarr ycarr yfs zcarr zfs by auto
then have "wfactors G (ys@zs) x"
by (simp add: x)
with xscarr show "\<exists>xs. set xs \<subseteq> carrier G \<and> wfactors G xs x"
by fast
qed
qed
qed
from acarr show ?thesis by (rule r)
qed
subsubsection \<open>Primeness condition\<close>
lemma (in comm_monoid_cancel) multlist_prime_pos:
assumes aprime: "prime G a" and carr: "a \<in> carrier G"
and as: "set as \<subseteq> carrier G" "a divides (foldr (\<otimes>) as \<one>)"
shows "\<exists>i<length as. a divides (as!i)"
using as
proof (induction as)
case Nil
then show ?case
by simp (meson Units_one_closed aprime carr divides_unit primeE)
next
case (Cons x as)
then have "x \<in> carrier G" "set as \<subseteq> carrier G" and "a divides x \<otimes> foldr (\<otimes>) as \<one>"
by (auto simp: )
with carr aprime have "a divides x \<or> a divides foldr (\<otimes>) as \<one>"
by (intro prime_divides) simp+
then show ?case
using Cons.IH Cons.prems(1) by force
qed
proposition (in primeness_condition_monoid) wfactors_unique:
assumes "wfactors G as a" "wfactors G as' a"
and "a \<in> carrier G" "set as \<subseteq> carrier G" "set as' \<subseteq> carrier G"
shows "essentially_equal G as as'"
using assms
proof (induct as arbitrary: a as')
case Nil
then have "a \<sim> \<one>"
by (meson Units_one_closed one_closed perm.Nil perm_wfactorsD unit_wfactors)
then have "as' = []"
using Nil.prems assoc_unit_l unit_wfactors_empty by blast
then show ?case
by auto
next
case (Cons ah as)
then have ahdvda: "ah divides a"
using wfactors_dividesI by auto
then obtain a' where a'carr: "a' \<in> carrier G" and a: "a = ah \<otimes> a'"
by blast
have carr_ah: "ah \<in> carrier G" "set as \<subseteq> carrier G"
using Cons.prems by fastforce+
have "ah \<otimes> foldr (\<otimes>) as \<one> \<sim> a"
by (rule wfactorsE[OF \<open>wfactors G (ah # as) a\<close>]) auto
then have "foldr (\<otimes>) as \<one> \<sim> a'"
by (metis Cons.prems(4) a a'carr assoc_l_cancel insert_subset list.set(2) monoid.multlist_closed monoid_axioms)
then
have a'fs: "wfactors G as a'"
by (meson Cons.prems(1) set_subset_Cons subset_iff wfactorsE wfactorsI)
then have ahirr: "irreducible G ah"
by (meson Cons.prems(1) list.set_intros(1) wfactorsE)
with Cons have ahprime: "prime G ah"
by (simp add: irreducible_prime)
note ahdvda
also have "a divides (foldr (\<otimes>) as' \<one>)"
by (meson Cons.prems(2) associatedE wfactorsE)
finally have "ah divides (foldr (\<otimes>) as' \<one>)"
using Cons.prems(4) by auto
with ahprime have "\<exists>i<length as'. ah divides as'!i"
by (intro multlist_prime_pos) (use Cons.prems in auto)
then obtain i where len: "i<length as'" and ahdvd: "ah divides as'!i"
by blast
then obtain x where "x \<in> carrier G" and asi: "as'!i = ah \<otimes> x"
by blast
have irrasi: "irreducible G (as'!i)"
using nth_mem[OF len] wfactorsE
by (metis Cons.prems(2))
have asicarr[simp]: "as'!i \<in> carrier G"
using len \<open>set as' \<subseteq> carrier G\<close> nth_mem by blast
have asiah: "as'!i \<sim> ah"
by (metis \<open>ah \<in> carrier G\<close> \<open>x \<in> carrier G\<close> asi irrasi ahprime associatedI2 irreducible_prodE primeE)
note setparts = set_take_subset[of i as'] set_drop_subset[of "Suc i" as']
have "\<exists>aa_1. aa_1 \<in> carrier G \<and> wfactors G (take i as') aa_1"
using Cons
by (metis setparts(1) subset_trans in_set_takeD wfactorsE wfactors_prod_exists)
then obtain aa_1 where aa1carr [simp]: "aa_1 \<in> carrier G" and aa1fs: "wfactors G (take i as') aa_1"
by auto
obtain aa_2 where aa2carr [simp]: "aa_2 \<in> carrier G"
and aa2fs: "wfactors G (drop (Suc i) as') aa_2"
by (metis Cons.prems(2) Cons.prems(5) subset_code(1) in_set_dropD wfactors_def wfactors_prod_exists)
have set_drop: "set (drop (Suc i) as') \<subseteq> carrier G"
using Cons.prems(5) setparts(2) by blast
moreover have set_take: "set (take i as') \<subseteq> carrier G"
using Cons.prems(5) setparts by auto
moreover have v1: "wfactors G (take i as' @ drop (Suc i) as') (aa_1 \<otimes> aa_2)"
using aa1fs aa2fs \<open>set as' \<subseteq> carrier G\<close> by (force simp add: dest: in_set_takeD in_set_dropD)
ultimately have v1': "wfactors G (as'!i # take i as' @ drop (Suc i) as') (as'!i \<otimes> (aa_1 \<otimes> aa_2))"
using irrasi wfactors_mult_single
by (simp add: irrasi v1 wfactors_mult_single)
have "wfactors G (as'!i # drop (Suc i) as') (as'!i \<otimes> aa_2)"
by (simp add: aa2fs irrasi set_drop wfactors_mult_single)
with len aa1carr aa2carr aa1fs
have v2: "wfactors G (take i as' @ as'!i # drop (Suc i) as') (aa_1 \<otimes> (as'!i \<otimes> aa_2))"
using wfactors_mult by (simp add: set_take set_drop)
from len have as': "as' = (take i as' @ as'!i # drop (Suc i) as')"
by (simp add: Cons_nth_drop_Suc)
have eer: "essentially_equal G (take i as' @ as'!i # drop (Suc i) as') as'"
using Cons.prems(5) as' by auto
with v2 aa1carr aa2carr nth_mem[OF len] have "aa_1 \<otimes> (as'!i \<otimes> aa_2) \<sim> a"
using Cons.prems as' comm_monoid_cancel.ee_wfactorsD is_comm_monoid_cancel by fastforce
then have t1: "as'!i \<otimes> (aa_1 \<otimes> aa_2) \<sim> a"
by (metis aa1carr aa2carr asicarr m_lcomm)
from asiah have "ah \<otimes> (aa_1 \<otimes> aa_2) \<sim> as'!i \<otimes> (aa_1 \<otimes> aa_2)"
by (simp add: \<open>ah \<in> carrier G\<close> associated_sym mult_cong_l)
also note t1
finally have "ah \<otimes> (aa_1 \<otimes> aa_2) \<sim> a"
using Cons.prems(3) carr_ah aa1carr aa2carr by blast
with aa1carr aa2carr a'carr nth_mem[OF len] have a': "aa_1 \<otimes> aa_2 \<sim> a'"
using a assoc_l_cancel carr_ah(1) by blast
note v1
also note a'
finally have "wfactors G (take i as' @ drop (Suc i) as') a'"
by (simp add: a'carr set_drop set_take)
from a'fs this have "essentially_equal G as (take i as' @ drop (Suc i) as')"
using Cons.hyps a'carr carr_ah(2) set_drop set_take by auto
with carr_ah have ee1: "essentially_equal G (ah # as) (ah # take i as' @ drop (Suc i) as')"
by (auto simp: essentially_equal_def)
have ee2: "essentially_equal G (ah # take i as' @ drop (Suc i) as')
(as' ! i # take i as' @ drop (Suc i) as')"
proof (intro essentially_equalI)
show "ah # take i as' @ drop (Suc i) as' <~~> ah # take i as' @ drop (Suc i) as'"
by simp
next
show "ah # take i as' @ drop (Suc i) as' [\<sim>] as' ! i # take i as' @ drop (Suc i) as'"
by (simp add: asiah associated_sym set_drop set_take)
qed
note ee1
also note ee2
also have "essentially_equal G (as' ! i # take i as' @ drop (Suc i) as')
(take i as' @ as' ! i # drop (Suc i) as')"
by (metis Cons.prems(5) as' essentially_equalI listassoc_refl perm_append_Cons)
finally have "essentially_equal G (ah # as) (take i as' @ as' ! i # drop (Suc i) as')"
using Cons.prems(4) set_drop set_take by auto
then show ?case
using as' by auto
qed
subsubsection \<open>Application to factorial monoids\<close>
text \<open>Number of factors for wellfoundedness\<close>
definition factorcount :: "_ \<Rightarrow> 'a \<Rightarrow> nat"
where "factorcount G a =
(THE c. \<forall>as. set as \<subseteq> carrier G \<and> wfactors G as a \<longrightarrow> c = length as)"
lemma (in monoid) ee_length:
assumes ee: "essentially_equal G as bs"
shows "length as = length bs"
by (rule essentially_equalE[OF ee]) (metis list_all2_conv_all_nth perm_length)
lemma (in factorial_monoid) factorcount_exists:
assumes carr[simp]: "a \<in> carrier G"
shows "\<exists>c. \<forall>as. set as \<subseteq> carrier G \<and> wfactors G as a \<longrightarrow> c = length as"
proof -
have "\<exists>as. set as \<subseteq> carrier G \<and> wfactors G as a"
by (intro wfactors_exist) simp
then obtain as where ascarr[simp]: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by (auto simp del: carr)
have "\<forall>as'. set as' \<subseteq> carrier G \<and> wfactors G as' a \<longrightarrow> length as = length as'"
by (metis afs ascarr assms ee_length wfactors_unique)
then show "\<exists>c. \<forall>as'. set as' \<subseteq> carrier G \<and> wfactors G as' a \<longrightarrow> c = length as'" ..
qed
lemma (in factorial_monoid) factorcount_unique:
assumes afs: "wfactors G as a"
and acarr[simp]: "a \<in> carrier G" and ascarr: "set as \<subseteq> carrier G"
shows "factorcount G a = length as"
proof -
have "\<exists>ac. \<forall>as. set as \<subseteq> carrier G \<and> wfactors G as a \<longrightarrow> ac = length as"
by (rule factorcount_exists) simp
then obtain ac where alen: "\<forall>as. set as \<subseteq> carrier G \<and> wfactors G as a \<longrightarrow> ac = length as"
by auto
then have ac: "ac = factorcount G a"
unfolding factorcount_def using ascarr by (blast intro: theI2 afs)
from ascarr afs have "ac = length as"
by (simp add: alen)
with ac show ?thesis
by simp
qed
lemma (in factorial_monoid) divides_fcount:
assumes dvd: "a divides b"
and acarr: "a \<in> carrier G"
and bcarr:"b \<in> carrier G"
shows "factorcount G a \<le> factorcount G b"
proof (rule dividesE[OF dvd])
fix c
from assms have "\<exists>as. set as \<subseteq> carrier G \<and> wfactors G as a"
by blast
then obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by blast
with acarr have fca: "factorcount G a = length as"
by (intro factorcount_unique)
assume ccarr: "c \<in> carrier G"
then have "\<exists>cs. set cs \<subseteq> carrier G \<and> wfactors G cs c"
by blast
then obtain cs where cscarr: "set cs \<subseteq> carrier G" and cfs: "wfactors G cs c"
by blast
note [simp] = acarr bcarr ccarr ascarr cscarr
assume b: "b = a \<otimes> c"
from afs cfs have "wfactors G (as@cs) (a \<otimes> c)"
by (intro wfactors_mult) simp_all
with b have "wfactors G (as@cs) b"
by simp
then have "factorcount G b = length (as@cs)"
by (intro factorcount_unique) simp_all
then have "factorcount G b = length as + length cs"
by simp
with fca show ?thesis
by simp
qed
lemma (in factorial_monoid) associated_fcount:
assumes acarr: "a \<in> carrier G"
and bcarr: "b \<in> carrier G"
and asc: "a \<sim> b"
shows "factorcount G a = factorcount G b"
using assms
by (auto simp: associated_def factorial_monoid.divides_fcount factorial_monoid_axioms le_antisym)
lemma (in factorial_monoid) properfactor_fcount:
assumes acarr: "a \<in> carrier G" and bcarr:"b \<in> carrier G"
and pf: "properfactor G a b"
shows "factorcount G a < factorcount G b"
proof (rule properfactorE[OF pf], elim dividesE)
fix c
from assms have "\<exists>as. set as \<subseteq> carrier G \<and> wfactors G as a"
by blast
then obtain as where ascarr: "set as \<subseteq> carrier G" and afs: "wfactors G as a"
by blast
with acarr have fca: "factorcount G a = length as"
by (intro factorcount_unique)
assume ccarr: "c \<in> carrier G"
then have "\<exists>cs. set cs \<subseteq> carrier G \<and> wfactors G cs c"
by blast
then obtain cs where cscarr: "set cs \<subseteq> carrier G" and cfs: "wfactors G cs c"
by blast
assume b: "b = a \<otimes> c"
have "wfactors G (as@cs) (a \<otimes> c)"
by (rule wfactors_mult) fact+
with b have "wfactors G (as@cs) b"
by simp
with ascarr cscarr bcarr have "factorcount G b = length (as@cs)"
by (simp add: factorcount_unique)
then have fcb: "factorcount G b = length as + length cs"
by simp
assume nbdvda: "\<not> b divides a"
have "c \<notin> Units G"
proof
assume cunit:"c \<in> Units G"
have "b \<otimes> inv c = a \<otimes> c \<otimes> inv c"
by (simp add: b)
also from ccarr acarr cunit have "\<dots> = a \<otimes> (c \<otimes> inv c)"
by (fast intro: m_assoc)
also from ccarr cunit have "\<dots> = a \<otimes> \<one>" by simp
also from acarr have "\<dots> = a" by simp
finally have "a = b \<otimes> inv c" by simp
with ccarr cunit have "b divides a"
by (fast intro: dividesI[of "inv c"])
with nbdvda show False by simp
qed
with cfs have "length cs > 0"
by (metis Units_one_closed assoc_unit_r ccarr foldr.simps(1) id_apply length_greater_0_conv wfactors_def)
with fca fcb show ?thesis
by simp
qed
sublocale factorial_monoid \<subseteq> divisor_chain_condition_monoid
apply unfold_locales
apply (rule wfUNIVI)
apply (rule measure_induct[of "factorcount G"])
using properfactor_fcount by auto
sublocale factorial_monoid \<subseteq> primeness_condition_monoid
by standard (rule irreducible_prime)
lemma (in factorial_monoid) primeness_condition: "primeness_condition_monoid G" ..
lemma (in factorial_monoid) gcd_condition [simp]: "gcd_condition_monoid G"
by standard (rule gcdof_exists)
sublocale factorial_monoid \<subseteq> gcd_condition_monoid
by standard (rule gcdof_exists)
lemma (in factorial_monoid) division_weak_lattice [simp]: "weak_lattice (division_rel G)"
proof -
interpret weak_lower_semilattice "division_rel G"
by simp
show "weak_lattice (division_rel G)"
proof (unfold_locales, simp_all)
fix x y
assume carr: "x \<in> carrier G" "y \<in> carrier G"
from lcmof_exists [OF this] obtain z where zcarr: "z \<in> carrier G" and isgcd: "z lcmof x y"
by blast
with carr have "least (division_rel G) z (Upper (division_rel G) {x, y})"
by (simp add: lcmof_leastUpper[symmetric])
then show "\<exists>z. least (division_rel G) z (Upper (division_rel G) {x, y})"
by blast
qed
qed
subsection \<open>Factoriality Theorems\<close>
theorem factorial_condition_one: (* Jacobson theorem 2.21 *)
"divisor_chain_condition_monoid G \<and> primeness_condition_monoid G \<longleftrightarrow> factorial_monoid G"
proof (rule iffI, clarify)
assume dcc: "divisor_chain_condition_monoid G"
and pc: "primeness_condition_monoid G"
interpret divisor_chain_condition_monoid "G" by (rule dcc)
interpret primeness_condition_monoid "G" by (rule pc)
show "factorial_monoid G"
by (fast intro: factorial_monoidI wfactors_exist wfactors_unique)
next
assume "factorial_monoid G"
then interpret factorial_monoid "G" .
show "divisor_chain_condition_monoid G \<and> primeness_condition_monoid G"
by rule unfold_locales
qed
theorem factorial_condition_two: (* Jacobson theorem 2.22 *)
"divisor_chain_condition_monoid G \<and> gcd_condition_monoid G \<longleftrightarrow> factorial_monoid G"
proof (rule iffI, clarify)
assume dcc: "divisor_chain_condition_monoid G"
and gc: "gcd_condition_monoid G"
interpret divisor_chain_condition_monoid "G" by (rule dcc)
interpret gcd_condition_monoid "G" by (rule gc)
show "factorial_monoid G"
by (simp add: factorial_condition_one[symmetric], rule, unfold_locales)
next
assume "factorial_monoid G"
then interpret factorial_monoid "G" .
show "divisor_chain_condition_monoid G \<and> gcd_condition_monoid G"
by rule unfold_locales
qed
end