isabelle: src/ZF/ex/Group.thy@69916a850301 (annotated)

32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 29223 diff changeset	1	(* Title: ZF/ex/Group.thy *)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	2
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	3	header {* Groups *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	4
16417 9bc16273c2d4 migrated theory headers to new format haftmann parents: 14891 diff changeset	5	theory Group imports Main begin
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	6
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	7	text{*Based on work by Clemens Ballarin, Florian Kammueller, L C Paulson and
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	8	Markus Wenzel.*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	9
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	10
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	11	subsection {* Monoids *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	12
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	13	(*First, we must simulate a record declaration:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	14	record monoid =
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	15	carrier :: i
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	16	mult :: "[i,i] => i" (infixl "\<cdot>\<index>" 70)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	17	one :: i ("\<one>\<index>")
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	18	*)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	19
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	20	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	21	carrier :: "i => i" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	22	"carrier(M) == fst(M)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	23
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	24	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	25	mmult :: "[i, i, i] => i" (infixl "\<cdot>\<index>" 70) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	26	"mmult(M,x,y) == fst(snd(M)) ` <x,y>"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	27
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	28	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	29	one :: "i => i" ("\<one>\<index>") where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	30	"one(M) == fst(snd(snd(M)))"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	31
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	32	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	33	update_carrier :: "[i,i] => i" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	34	"update_carrier(M,A) == <A,snd(M)>"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	35
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	36	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	37	m_inv :: "i => i => i" ("inv\<index> _" [81] 80) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	38	"inv\<^bsub>G\<^esub> x == (THE y. y \<in> carrier(G) & y \<cdot>\<^bsub>G\<^esub> x = \<one>\<^bsub>G\<^esub> & x \<cdot>\<^bsub>G\<^esub> y = \<one>\<^bsub>G\<^esub>)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	39
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	40	locale monoid = fixes G (structure)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	41	assumes m_closed [intro, simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	42	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> x \<cdot> y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	43	and m_assoc:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	44	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G); z \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	45	\<Longrightarrow> (x \<cdot> y) \<cdot> z = x \<cdot> (y \<cdot> z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	46	and one_closed [intro, simp]: "\<one> \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	47	and l_one [simp]: "x \<in> carrier(G) \<Longrightarrow> \<one> \<cdot> x = x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	48	and r_one [simp]: "x \<in> carrier(G) \<Longrightarrow> x \<cdot> \<one> = x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	49
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	50	text{Simulating the record}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	51	lemma carrier_eq [simp]: "carrier(<A,Z>) = A"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	52	by (simp add: carrier_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	53
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	54	lemma mult_eq [simp]: "mmult(<A,M,Z>, x, y) = M ` <x,y>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	55	by (simp add: mmult_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	56
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	57	lemma one_eq [simp]: "one(<A,M,I,Z>) = I"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	58	by (simp add: one_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	59
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	60	lemma update_carrier_eq [simp]: "update_carrier(<A,Z>,B) = <B,Z>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	61	by (simp add: update_carrier_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	62
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	63	lemma carrier_update_carrier [simp]: "carrier(update_carrier(M,B)) = B"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	64	by (simp add: update_carrier_def)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	65
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	66	lemma mult_update_carrier [simp]: "mmult(update_carrier(M,B),x,y) = mmult(M,x,y)"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	67	by (simp add: update_carrier_def mmult_def)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	68
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	69	lemma one_update_carrier [simp]: "one(update_carrier(M,B)) = one(M)"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	70	by (simp add: update_carrier_def one_def)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	71
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	72
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	73	lemma (in monoid) inv_unique:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	74	assumes eq: "y \<cdot> x = \<one>" "x \<cdot> y' = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	75	and G: "x \<in> carrier(G)" "y \<in> carrier(G)" "y' \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	76	shows "y = y'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	77	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	78	from G eq have "y = y \<cdot> (x \<cdot> y')" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	79	also from G have "... = (y \<cdot> x) \<cdot> y'" by (simp add: m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	80	also from G eq have "... = y'" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	81	finally show ?thesis .
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	82	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	83
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	84	text {*
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	85	A group is a monoid all of whose elements are invertible.
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	86	*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	87
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	88	locale group = monoid +
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	89	assumes inv_ex:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	90	"\<And>x. x \<in> carrier(G) \<Longrightarrow> \<exists>y \<in> carrier(G). y \<cdot> x = \<one> & x \<cdot> y = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	91
26199 04817a8802f2 explicit referencing of background facts; wenzelm parents: 22931 diff changeset	92	lemma (in group) is_group [simp]: "group(G)" by (rule group_axioms)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	93
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	94	theorem groupI:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	95	fixes G (structure)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	96	assumes m_closed [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	97	"\<And>x y. \<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> x \<cdot> y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	98	and one_closed [simp]: "\<one> \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	99	and m_assoc:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	100	"\<And>x y z. \<lbrakk>x \<in> carrier(G); y \<in> carrier(G); z \<in> carrier(G)\<rbrakk> \<Longrightarrow>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	101	(x \<cdot> y) \<cdot> z = x \<cdot> (y \<cdot> z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	102	and l_one [simp]: "\<And>x. x \<in> carrier(G) \<Longrightarrow> \<one> \<cdot> x = x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	103	and l_inv_ex: "\<And>x. x \<in> carrier(G) \<Longrightarrow> \<exists>y \<in> carrier(G). y \<cdot> x = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	104	shows "group(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	105	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	106	have l_cancel [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	107	"\<And>x y z. \<lbrakk>x \<in> carrier(G); y \<in> carrier(G); z \<in> carrier(G)\<rbrakk> \<Longrightarrow>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	108	(x \<cdot> y = x \<cdot> z) <-> (y = z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	109	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	110	fix x y z
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	111	assume G: "x \<in> carrier(G)" "y \<in> carrier(G)" "z \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	112	{
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	113	assume eq: "x \<cdot> y = x \<cdot> z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	114	with G l_inv_ex obtain x_inv where xG: "x_inv \<in> carrier(G)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 29223 diff changeset	115	and l_inv: "x_inv \<cdot> x = \<one>" by fast
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	116	from G eq xG have "(x_inv \<cdot> x) \<cdot> y = (x_inv \<cdot> x) \<cdot> z"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 29223 diff changeset	117	by (simp add: m_assoc)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	118	with G show "y = z" by (simp add: l_inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	119	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	120	assume eq: "y = z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	121	with G show "x \<cdot> y = x \<cdot> z" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	122	}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	123	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	124	have r_one:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	125	"\<And>x. x \<in> carrier(G) \<Longrightarrow> x \<cdot> \<one> = x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	126	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	127	fix x
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	128	assume x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	129	with l_inv_ex obtain x_inv where xG: "x_inv \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	130	and l_inv: "x_inv \<cdot> x = \<one>" by fast
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	131	from x xG have "x_inv \<cdot> (x \<cdot> \<one>) = x_inv \<cdot> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	132	by (simp add: m_assoc [symmetric] l_inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	133	with x xG show "x \<cdot> \<one> = x" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	134	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	135	have inv_ex:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	136	"!!x. x \<in> carrier(G) ==> \<exists>y \<in> carrier(G). y \<cdot> x = \<one> & x \<cdot> y = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	137	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	138	fix x
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	139	assume x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	140	with l_inv_ex obtain y where y: "y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	141	and l_inv: "y \<cdot> x = \<one>" by fast
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	142	from x y have "y \<cdot> (x \<cdot> y) = y \<cdot> \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	143	by (simp add: m_assoc [symmetric] l_inv r_one)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	144	with x y have r_inv: "x \<cdot> y = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	145	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	146	from x y show "\<exists>y \<in> carrier(G). y \<cdot> x = \<one> & x \<cdot> y = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	147	by (fast intro: l_inv r_inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	148	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	149	show ?thesis
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	150	by (blast intro: group.intro monoid.intro group_axioms.intro
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	151	prems r_one inv_ex)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	152	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	153
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	154	lemma (in group) inv [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	155	"x \<in> carrier(G) \<Longrightarrow> inv x \<in> carrier(G) & inv x \<cdot> x = \<one> & x \<cdot> inv x = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	156	apply (frule inv_ex)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	157	apply (unfold Bex_def m_inv_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	158	apply (erule exE)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	159	apply (rule theI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	160	apply (rule ex1I, assumption)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	161	apply (blast intro: inv_unique)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	162	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	163
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	164	lemma (in group) inv_closed [intro!]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	165	"x \<in> carrier(G) \<Longrightarrow> inv x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	166	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	167
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	168	lemma (in group) l_inv:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	169	"x \<in> carrier(G) \<Longrightarrow> inv x \<cdot> x = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	170	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	171
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	172	lemma (in group) r_inv:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	173	"x \<in> carrier(G) \<Longrightarrow> x \<cdot> inv x = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	174	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	175
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	176
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	177	subsection {* Cancellation Laws and Basic Properties *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	178
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	179	lemma (in group) l_cancel [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	180	assumes [simp]: "x \<in> carrier(G)" "y \<in> carrier(G)" "z \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	181	shows "(x \<cdot> y = x \<cdot> z) <-> (y = z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	182	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	183	assume eq: "x \<cdot> y = x \<cdot> z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	184	hence "(inv x \<cdot> x) \<cdot> y = (inv x \<cdot> x) \<cdot> z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	185	by (simp only: m_assoc inv_closed prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	186	thus "y = z" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	187	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	188	assume eq: "y = z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	189	then show "x \<cdot> y = x \<cdot> z" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	190	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	191
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	192	lemma (in group) r_cancel [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	193	assumes [simp]: "x \<in> carrier(G)" "y \<in> carrier(G)" "z \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	194	shows "(y \<cdot> x = z \<cdot> x) <-> (y = z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	195	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	196	assume eq: "y \<cdot> x = z \<cdot> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	197	then have "y \<cdot> (x \<cdot> inv x) = z \<cdot> (x \<cdot> inv x)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	198	by (simp only: m_assoc [symmetric] inv_closed prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	199	thus "y = z" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	200	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	201	assume eq: "y = z"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	202	thus "y \<cdot> x = z \<cdot> x" by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	203	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	204
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	205	lemma (in group) inv_comm:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	206	assumes inv: "x \<cdot> y = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	207	and G: "x \<in> carrier(G)" "y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	208	shows "y \<cdot> x = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	209	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	210	from G have "x \<cdot> y \<cdot> x = x \<cdot> \<one>" by (auto simp add: inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	211	with G show ?thesis by (simp del: r_one add: m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	212	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	213
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	214	lemma (in group) inv_equality:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	215	"\<lbrakk>y \<cdot> x = \<one>; x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> inv x = y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	216	apply (simp add: m_inv_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	217	apply (rule the_equality)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	218	apply (simp add: inv_comm [of y x])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	219	apply (rule r_cancel [THEN iffD1], auto)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	220	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	221
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	222	lemma (in group) inv_one [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	223	"inv \<one> = \<one>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	224	by (auto intro: inv_equality)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	225
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	226	lemma (in group) inv_inv [simp]: "x \<in> carrier(G) \<Longrightarrow> inv (inv x) = x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	227	by (auto intro: inv_equality)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	228
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	229	text{This proof is by cancellation}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	230	lemma (in group) inv_mult_group:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	231	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> inv (x \<cdot> y) = inv y \<cdot> inv x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	232	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	233	assume G: "x \<in> carrier(G)" "y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	234	then have "inv (x \<cdot> y) \<cdot> (x \<cdot> y) = (inv y \<cdot> inv x) \<cdot> (x \<cdot> y)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	235	by (simp add: m_assoc l_inv) (simp add: m_assoc [symmetric] l_inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	236	with G show ?thesis by (simp_all del: inv add: inv_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	237	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	238
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	239
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	240	subsection {* Substructures *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	241
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	242	locale subgroup = fixes H and G (structure)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	243	assumes subset: "H \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	244	and m_closed [intro, simp]: "\<lbrakk>x \<in> H; y \<in> H\<rbrakk> \<Longrightarrow> x \<cdot> y \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	245	and one_closed [simp]: "\<one> \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	246	and m_inv_closed [intro,simp]: "x \<in> H \<Longrightarrow> inv x \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	247
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	248
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	249	lemma (in subgroup) mem_carrier [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	250	"x \<in> H \<Longrightarrow> x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	251	using subset by blast
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	252
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	253
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	254	lemma subgroup_imp_subset:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	255	"subgroup(H,G) \<Longrightarrow> H \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	256	by (rule subgroup.subset)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	257
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	258	lemma (in subgroup) group_axiomsI [intro]:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	259	assumes "group(G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	260	shows "group_axioms (update_carrier(G,H))"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	261	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	262	interpret group G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	263	show ?thesis by (force intro: group_axioms.intro l_inv r_inv)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	264	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	265
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	266	lemma (in subgroup) is_group [intro]:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	267	assumes "group(G)"
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	268	shows "group (update_carrier(G,H))"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	269	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	270	interpret group G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	271	show ?thesis
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	272	by (rule groupI) (auto intro: m_assoc l_inv mem_carrier)
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	273	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	274
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	275	text {*
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	276	Since @{term H} is nonempty, it contains some element @{term x}. Since
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	277	it is closed under inverse, it contains @{text "inv x"}. Since
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	278	it is closed under product, it contains @{text "x \<cdot> inv x = \<one>"}.
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	279	*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	280
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	281	text {*
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	282	Since @{term H} is nonempty, it contains some element @{term x}. Since
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	283	it is closed under inverse, it contains @{text "inv x"}. Since
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	284	it is closed under product, it contains @{text "x \<cdot> inv x = \<one>"}.
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	285	*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	286
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	287	lemma (in group) one_in_subset:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	288	"\<lbrakk>H \<subseteq> carrier(G); H \<noteq> 0; \<forall>a \<in> H. inv a \<in> H; \<forall>a\<in>H. \<forall>b\<in>H. a \<cdot> b \<in> H\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	289	\<Longrightarrow> \<one> \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	290	by (force simp add: l_inv)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	291
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	292	text {* A characterization of subgroups: closed, non-empty subset. *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	293
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	294	declare monoid.one_closed [simp] group.inv_closed [simp]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	295	monoid.l_one [simp] monoid.r_one [simp] group.inv_inv [simp]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	296
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	297	lemma subgroup_nonempty:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	298	"~ subgroup(0,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	299	by (blast dest: subgroup.one_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	300
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	301
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	302	subsection {* Direct Products *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	303
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	304	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	305	DirProdGroup :: "[i,i] => i" (infixr "\<Otimes>" 80) where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	306	"G \<Otimes> H == <carrier(G) \<times> carrier(H),
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	307	(\<lambda><<g,h>, <g', h'>>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	308	\<in> (carrier(G) \<times> carrier(H)) \<times> (carrier(G) \<times> carrier(H)).
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	309	<g \<cdot>\<^bsub>G\<^esub> g', h \<cdot>\<^bsub>H\<^esub> h'>),
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	310	<\<one>\<^bsub>G\<^esub>, \<one>\<^bsub>H\<^esub>>, 0>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	311
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	312	lemma DirProdGroup_group:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	313	assumes "group(G)" and "group(H)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	314	shows "group (G \<Otimes> H)"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	315	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	316	interpret G: group G by fact
e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	317	interpret H: group H by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	318	show ?thesis by (force intro!: groupI G.m_assoc H.m_assoc G.l_inv H.l_inv
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	319	simp add: DirProdGroup_def)
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	320	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	321
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	322	lemma carrier_DirProdGroup [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	323	"carrier (G \<Otimes> H) = carrier(G) \<times> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	324	by (simp add: DirProdGroup_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	325
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	326	lemma one_DirProdGroup [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	327	"\<one>\<^bsub>G \<Otimes> H\<^esub> = <\<one>\<^bsub>G\<^esub>, \<one>\<^bsub>H\<^esub>>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	328	by (simp add: DirProdGroup_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	329
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	330	lemma mult_DirProdGroup [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	331	"[\|g \<in> carrier(G); h \<in> carrier(H); g' \<in> carrier(G); h' \<in> carrier(H)\|]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	332	==> <g, h> \<cdot>\<^bsub>G \<Otimes> H\<^esub> <g', h'> = <g \<cdot>\<^bsub>G\<^esub> g', h \<cdot>\<^bsub>H\<^esub> h'>"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	333	by (simp add: DirProdGroup_def)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	334
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	335	lemma inv_DirProdGroup [simp]:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	336	assumes "group(G)" and "group(H)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	337	assumes g: "g \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	338	and h: "h \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	339	shows "inv \<^bsub>G \<Otimes> H\<^esub> <g, h> = <inv\<^bsub>G\<^esub> g, inv\<^bsub>H\<^esub> h>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	340	apply (rule group.inv_equality [OF DirProdGroup_group])
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	341	apply (simp_all add: prems group.l_inv)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	342	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	343
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	344	subsection {* Isomorphisms *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	345
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	346	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	347	hom :: "[i,i] => i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	348	"hom(G,H) ==
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	349	{h \<in> carrier(G) -> carrier(H).
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	350	(\<forall>x \<in> carrier(G). \<forall>y \<in> carrier(G). h ` (x \<cdot>\<^bsub>G\<^esub> y) = (h ` x) \<cdot>\<^bsub>H\<^esub> (h ` y))}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	351
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	352	lemma hom_mult:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	353	"\<lbrakk>h \<in> hom(G,H); x \<in> carrier(G); y \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	354	\<Longrightarrow> h ` (x \<cdot>\<^bsub>G\<^esub> y) = h ` x \<cdot>\<^bsub>H\<^esub> h ` y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	355	by (simp add: hom_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	356
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	357	lemma hom_closed:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	358	"\<lbrakk>h \<in> hom(G,H); x \<in> carrier(G)\<rbrakk> \<Longrightarrow> h ` x \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	359	by (auto simp add: hom_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	360
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	361	lemma (in group) hom_compose:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	362	"\<lbrakk>h \<in> hom(G,H); i \<in> hom(H,I)\<rbrakk> \<Longrightarrow> i O h \<in> hom(G,I)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	363	by (force simp add: hom_def comp_fun)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	364
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	365	lemma hom_is_fun:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	366	"h \<in> hom(G,H) \<Longrightarrow> h \<in> carrier(G) -> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	367	by (simp add: hom_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	368
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	369
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	370	subsection {* Isomorphisms *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	371
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	372	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	373	iso :: "[i,i] => i" (infixr "\<cong>" 60) where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	374	"G \<cong> H == hom(G,H) \<inter> bij(carrier(G), carrier(H))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	375
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	376	lemma (in group) iso_refl: "id(carrier(G)) \<in> G \<cong> G"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	377	by (simp add: iso_def hom_def id_type id_bij)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	378
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	379
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	380	lemma (in group) iso_sym:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	381	"h \<in> G \<cong> H \<Longrightarrow> converse(h) \<in> H \<cong> G"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	382	apply (simp add: iso_def bij_converse_bij, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	383	apply (subgoal_tac "converse(h) \<in> carrier(H) \<rightarrow> carrier(G)")
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	384	prefer 2 apply (simp add: bij_converse_bij bij_is_fun)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	385	apply (auto intro: left_inverse_eq [of _ "carrier(G)" "carrier(H)"]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	386	simp add: hom_def bij_is_inj right_inverse_bij);
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	387	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	388
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	389	lemma (in group) iso_trans:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	390	"\<lbrakk>h \<in> G \<cong> H; i \<in> H \<cong> I\<rbrakk> \<Longrightarrow> i O h \<in> G \<cong> I"
22931 11cc1ccad58e tuned proofs; wenzelm parents: 21404 diff changeset	391	by (auto simp add: iso_def hom_compose comp_bij)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	392
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	393	lemma DirProdGroup_commute_iso:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	394	assumes "group(G)" and "group(H)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	395	shows "(\<lambda><x,y> \<in> carrier(G \<Otimes> H). <y,x>) \<in> (G \<Otimes> H) \<cong> (H \<Otimes> G)"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	396	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	397	interpret group G by fact
e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	398	interpret group H by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	399	show ?thesis by (auto simp add: iso_def hom_def inj_def surj_def bij_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	400	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	401
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	402	lemma DirProdGroup_assoc_iso:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	403	assumes "group(G)" and "group(H)" and "group(I)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	404	shows "(\<lambda><<x,y>,z> \<in> carrier((G \<Otimes> H) \<Otimes> I). <x,<y,z>>)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	405	\<in> ((G \<Otimes> H) \<Otimes> I) \<cong> (G \<Otimes> (H \<Otimes> I))"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	406	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	407	interpret group G by fact
e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	408	interpret group H by fact
e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	409	interpret group I by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	410	show ?thesis
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	411	by (auto intro: lam_type simp add: iso_def hom_def inj_def surj_def bij_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	412	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	413
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	414	text{*Basis for homomorphism proofs: we assume two groups @{term G} and
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	415	@term{H}, with a homomorphism @{term h} between them*}
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	416	locale group_hom = G: group G + H: group H
e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	417	for G (structure) and H (structure) and h +
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	418	assumes homh: "h \<in> hom(G,H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	419	notes hom_mult [simp] = hom_mult [OF homh]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	420	and hom_closed [simp] = hom_closed [OF homh]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	421	and hom_is_fun [simp] = hom_is_fun [OF homh]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	422
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	423	lemma (in group_hom) one_closed [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	424	"h ` \<one> \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	425	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	426
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	427	lemma (in group_hom) hom_one [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	428	"h ` \<one> = \<one>\<^bsub>H\<^esub>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	429	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	430	have "h ` \<one> \<cdot>\<^bsub>H\<^esub> \<one>\<^bsub>H\<^esub> = (h ` \<one>) \<cdot>\<^bsub>H\<^esub> (h ` \<one>)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	431	by (simp add: hom_mult [symmetric] del: hom_mult)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	432	then show ?thesis by (simp del: r_one)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	433	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	434
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	435	lemma (in group_hom) inv_closed [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	436	"x \<in> carrier(G) \<Longrightarrow> h ` (inv x) \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	437	by simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	438
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	439	lemma (in group_hom) hom_inv [simp]:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	440	"x \<in> carrier(G) \<Longrightarrow> h ` (inv x) = inv\<^bsub>H\<^esub> (h ` x)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	441	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	442	assume x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	443	then have "h ` x \<cdot>\<^bsub>H\<^esub> h ` (inv x) = \<one>\<^bsub>H\<^esub>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	444	by (simp add: hom_mult [symmetric] G.r_inv del: hom_mult)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	445	also from x have "... = h ` x \<cdot>\<^bsub>H\<^esub> inv\<^bsub>H\<^esub> (h ` x)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	446	by (simp add: hom_mult [symmetric] H.r_inv del: hom_mult)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	447	finally have "h ` x \<cdot>\<^bsub>H\<^esub> h ` (inv x) = h ` x \<cdot>\<^bsub>H\<^esub> inv\<^bsub>H\<^esub> (h ` x)" .
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	448	with x show ?thesis by (simp del: inv add: is_group)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	449	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	450
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	451	subsection {* Commutative Structures *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	452
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	453	text {*
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	454	Naming convention: multiplicative structures that are commutative
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	455	are called \emph{commutative}, additive structures are called
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	456	\emph{Abelian}.
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	457	*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	458
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	459	subsection {* Definition *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	460
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	461	locale comm_monoid = monoid +
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	462	assumes m_comm: "\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> x \<cdot> y = y \<cdot> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	463
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	464	lemma (in comm_monoid) m_lcomm:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	465	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G); z \<in> carrier(G)\<rbrakk> \<Longrightarrow>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	466	x \<cdot> (y \<cdot> z) = y \<cdot> (x \<cdot> z)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	467	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	468	assume xyz: "x \<in> carrier(G)" "y \<in> carrier(G)" "z \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	469	from xyz have "x \<cdot> (y \<cdot> z) = (x \<cdot> y) \<cdot> z" by (simp add: m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	470	also from xyz have "... = (y \<cdot> x) \<cdot> z" by (simp add: m_comm)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	471	also from xyz have "... = y \<cdot> (x \<cdot> z)" by (simp add: m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	472	finally show ?thesis .
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	473	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	474
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	475	lemmas (in comm_monoid) m_ac = m_assoc m_comm m_lcomm
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	476
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	477	locale comm_group = comm_monoid + group
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	478
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	479	lemma (in comm_group) inv_mult:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	480	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk> \<Longrightarrow> inv (x \<cdot> y) = inv x \<cdot> inv y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	481	by (simp add: m_ac inv_mult_group)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	482
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	483
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	484	lemma (in group) subgroup_self: "subgroup (carrier(G),G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	485	by (simp add: subgroup_def prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	486
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	487	lemma (in group) subgroup_imp_group:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	488	"subgroup(H,G) \<Longrightarrow> group (update_carrier(G,H))"
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	489	by (simp add: subgroup.is_group)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	490
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	491	lemma (in group) subgroupI:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	492	assumes subset: "H \<subseteq> carrier(G)" and non_empty: "H \<noteq> 0"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	493	and inv: "!!a. a \<in> H ==> inv a \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	494	and mult: "!!a b. [\|a \<in> H; b \<in> H\|] ==> a \<cdot> b \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	495	shows "subgroup(H,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	496	proof (simp add: subgroup_def prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	497	show "\<one> \<in> H" by (rule one_in_subset) (auto simp only: prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	498	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	499
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	500
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	501	subsection {* Bijections of a Set, Permutation Groups, Automorphism Groups *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	502
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	503	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	504	BijGroup :: "i=>i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	505	"BijGroup(S) ==
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	506	<bij(S,S),
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	507	\<lambda><g,f> \<in> bij(S,S) \<times> bij(S,S). g O f,
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	508	id(S), 0>"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	509
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	510
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	511	subsection {Bijections Form a Group }
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	512
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	513	theorem group_BijGroup: "group(BijGroup(S))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	514	apply (simp add: BijGroup_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	515	apply (rule groupI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	516	apply (simp_all add: id_bij comp_bij comp_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	517	apply (simp add: id_bij bij_is_fun left_comp_id [of _ S S] fun_is_rel)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	518	apply (blast intro: left_comp_inverse bij_is_inj bij_converse_bij)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	519	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	520
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	521
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	522	subsection{Automorphisms Form a Group}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	523
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	524	lemma Bij_Inv_mem: "\<lbrakk>f \<in> bij(S,S); x \<in> S\<rbrakk> \<Longrightarrow> converse(f) ` x \<in> S"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	525	by (blast intro: apply_funtype bij_is_fun bij_converse_bij)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	526
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	527	lemma inv_BijGroup: "f \<in> bij(S,S) \<Longrightarrow> m_inv (BijGroup(S), f) = converse(f)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	528	apply (rule group.inv_equality)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	529	apply (rule group_BijGroup)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	530	apply (simp_all add: BijGroup_def bij_converse_bij
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	531	left_comp_inverse [OF bij_is_inj])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	532	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	533
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	534	lemma iso_is_bij: "h \<in> G \<cong> H ==> h \<in> bij(carrier(G), carrier(H))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	535	by (simp add: iso_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	536
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	537
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	538	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	539	auto :: "i=>i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	540	"auto(G) == iso(G,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	541
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	542	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	543	AutoGroup :: "i=>i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	544	"AutoGroup(G) == update_carrier(BijGroup(carrier(G)), auto(G))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	545
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	546
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	547	lemma (in group) id_in_auto: "id(carrier(G)) \<in> auto(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	548	by (simp add: iso_refl auto_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	549
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	550	lemma (in group) subgroup_auto:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	551	"subgroup (auto(G)) (BijGroup (carrier(G)))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	552	proof (rule subgroup.intro)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	553	show "auto(G) \<subseteq> carrier (BijGroup (carrier(G)))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	554	by (auto simp add: auto_def BijGroup_def iso_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	555	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	556	fix x y
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	557	assume "x \<in> auto(G)" "y \<in> auto(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	558	thus "x \<cdot>\<^bsub>BijGroup (carrier(G))\<^esub> y \<in> auto(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	559	by (auto simp add: BijGroup_def auto_def iso_def bij_is_fun
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	560	group.hom_compose comp_bij)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	561	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	562	show "\<one>\<^bsub>BijGroup (carrier(G))\<^esub> \<in> auto(G)" by (simp add: BijGroup_def id_in_auto)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	563	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	564	fix x
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	565	assume "x \<in> auto(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	566	thus "inv\<^bsub>BijGroup (carrier(G))\<^esub> x \<in> auto(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	567	by (simp add: auto_def inv_BijGroup iso_is_bij iso_sym)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	568	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	569
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	570	theorem (in group) AutoGroup: "group (AutoGroup(G))"
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	571	by (simp add: AutoGroup_def subgroup.is_group subgroup_auto group_BijGroup)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	572
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	573
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	574
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	575	subsection{Cosets and Quotient Groups}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	576
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	577	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	578	r_coset :: "[i,i,i] => i" (infixl "#>\<index>" 60) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	579	"H #>\<^bsub>G\<^esub> a == \<Union>h\<in>H. {h \<cdot>\<^bsub>G\<^esub> a}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	580
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	581	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	582	l_coset :: "[i,i,i] => i" (infixl "<#\<index>" 60) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	583	"a <#\<^bsub>G\<^esub> H == \<Union>h\<in>H. {a \<cdot>\<^bsub>G\<^esub> h}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	584
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	585	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	586	RCOSETS :: "[i,i] => i" ("rcosets\<index> _" [81] 80) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	587	"rcosets\<^bsub>G\<^esub> H == \<Union>a\<in>carrier(G). {H #>\<^bsub>G\<^esub> a}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	588
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	589	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	590	set_mult :: "[i,i,i] => i" (infixl "<#>\<index>" 60) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	591	"H <#>\<^bsub>G\<^esub> K == \<Union>h\<in>H. \<Union>k\<in>K. {h \<cdot>\<^bsub>G\<^esub> k}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	592
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	593	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	594	SET_INV :: "[i,i] => i" ("set'_inv\<index> _" [81] 80) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	595	"set_inv\<^bsub>G\<^esub> H == \<Union>h\<in>H. {inv\<^bsub>G\<^esub> h}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	596
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	597
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	598	locale normal = subgroup + group +
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	599	assumes coset_eq: "(\<forall>x \<in> carrier(G). H #> x = x <# H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	600
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	601	notation
5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	602	normal (infixl "\<lhd>" 60)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	603
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	604
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	605	subsection {Basic Properties of Cosets}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	606
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	607	lemma (in group) coset_mult_assoc:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	608	"\<lbrakk>M \<subseteq> carrier(G); g \<in> carrier(G); h \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	609	\<Longrightarrow> (M #> g) #> h = M #> (g \<cdot> h)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	610	by (force simp add: r_coset_def m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	611
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	612	lemma (in group) coset_mult_one [simp]: "M \<subseteq> carrier(G) \<Longrightarrow> M #> \<one> = M"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	613	by (force simp add: r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	614
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	615	lemma (in group) solve_equation:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	616	"\<lbrakk>subgroup(H,G); x \<in> H; y \<in> H\<rbrakk> \<Longrightarrow> \<exists>h\<in>H. y = h \<cdot> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	617	apply (rule bexI [of _ "y \<cdot> (inv x)"])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	618	apply (auto simp add: subgroup.m_closed subgroup.m_inv_closed m_assoc
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	619	subgroup.subset [THEN subsetD])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	620	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	621
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	622	lemma (in group) repr_independence:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	623	"\<lbrakk>y \<in> H #> x; x \<in> carrier(G); subgroup(H,G)\<rbrakk> \<Longrightarrow> H #> x = H #> y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	624	by (auto simp add: r_coset_def m_assoc [symmetric]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	625	subgroup.subset [THEN subsetD]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	626	subgroup.m_closed solve_equation)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	627
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	628	lemma (in group) coset_join2:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	629	"\<lbrakk>x \<in> carrier(G); subgroup(H,G); x\<in>H\<rbrakk> \<Longrightarrow> H #> x = H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	630	--{Alternative proof is to put @{term "x=\<one>"} in @{text repr_independence}.}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	631	by (force simp add: subgroup.m_closed r_coset_def solve_equation)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	632
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	633	lemma (in group) r_coset_subset_G:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	634	"\<lbrakk>H \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk> \<Longrightarrow> H #> x \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	635	by (auto simp add: r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	636
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	637	lemma (in group) rcosI:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	638	"\<lbrakk>h \<in> H; H \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk> \<Longrightarrow> h \<cdot> x \<in> H #> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	639	by (auto simp add: r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	640
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	641	lemma (in group) rcosetsI:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	642	"\<lbrakk>H \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk> \<Longrightarrow> H #> x \<in> rcosets H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	643	by (auto simp add: RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	644
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	645
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	646	text{Really needed?}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	647	lemma (in group) transpose_inv:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	648	"\<lbrakk>x \<cdot> y = z; x \<in> carrier(G); y \<in> carrier(G); z \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	649	\<Longrightarrow> (inv x) \<cdot> z = y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	650	by (force simp add: m_assoc [symmetric])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	651
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	652
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	653
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	654	subsection {* Normal subgroups *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	655
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	656	lemma normal_imp_subgroup: "H \<lhd> G ==> subgroup(H,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	657	by (simp add: normal_def subgroup_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	658
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	659	lemma (in group) normalI:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	660	"subgroup(H,G) \<Longrightarrow> (\<forall>x \<in> carrier(G). H #> x = x <# H) \<Longrightarrow> H \<lhd> G";
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	661	by (simp add: normal_def normal_axioms_def)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	662
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	663	lemma (in normal) inv_op_closed1:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	664	"\<lbrakk>x \<in> carrier(G); h \<in> H\<rbrakk> \<Longrightarrow> (inv x) \<cdot> h \<cdot> x \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	665	apply (insert coset_eq)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	666	apply (auto simp add: l_coset_def r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	667	apply (drule bspec, assumption)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	668	apply (drule equalityD1 [THEN subsetD], blast, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	669	apply (simp add: m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	670	apply (simp add: m_assoc [symmetric])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	671	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	672
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	673	lemma (in normal) inv_op_closed2:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	674	"\<lbrakk>x \<in> carrier(G); h \<in> H\<rbrakk> \<Longrightarrow> x \<cdot> h \<cdot> (inv x) \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	675	apply (subgoal_tac "inv (inv x) \<cdot> h \<cdot> (inv x) \<in> H")
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	676	apply simp
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	677	apply (blast intro: inv_op_closed1)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	678	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	679
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	680	text{Alternative characterization of normal subgroups}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	681	lemma (in group) normal_inv_iff:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	682	"(N \<lhd> G) <->
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	683	(subgroup(N,G) & (\<forall>x \<in> carrier(G). \<forall>h \<in> N. x \<cdot> h \<cdot> (inv x) \<in> N))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	684	(is "_ <-> ?rhs")
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	685	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	686	assume N: "N \<lhd> G"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	687	show ?rhs
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	688	by (blast intro: N normal.inv_op_closed2 normal_imp_subgroup)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	689	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	690	assume ?rhs
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	691	hence sg: "subgroup(N,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	692	and closed: "\<And>x. x\<in>carrier(G) \<Longrightarrow> \<forall>h\<in>N. x \<cdot> h \<cdot> inv x \<in> N" by auto
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	693	hence sb: "N \<subseteq> carrier(G)" by (simp add: subgroup.subset)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	694	show "N \<lhd> G"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	695	proof (intro normalI [OF sg], simp add: l_coset_def r_coset_def, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	696	fix x
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	697	assume x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	698	show "(\<Union>h\<in>N. {h \<cdot> x}) = (\<Union>h\<in>N. {x \<cdot> h})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	699	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	700	show "(\<Union>h\<in>N. {h \<cdot> x}) \<subseteq> (\<Union>h\<in>N. {x \<cdot> h})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	701	proof clarify
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	702	fix n
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	703	assume n: "n \<in> N"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	704	show "n \<cdot> x \<in> (\<Union>h\<in>N. {x \<cdot> h})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	705	proof (rule UN_I)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	706	from closed [of "inv x"]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	707	show "inv x \<cdot> n \<cdot> x \<in> N" by (simp add: x n)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	708	show "n \<cdot> x \<in> {x \<cdot> (inv x \<cdot> n \<cdot> x)}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	709	by (simp add: x n m_assoc [symmetric] sb [THEN subsetD])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	710	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	711	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	712	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	713	show "(\<Union>h\<in>N. {x \<cdot> h}) \<subseteq> (\<Union>h\<in>N. {h \<cdot> x})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	714	proof clarify
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	715	fix n
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	716	assume n: "n \<in> N"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	717	show "x \<cdot> n \<in> (\<Union>h\<in>N. {h \<cdot> x})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	718	proof (rule UN_I)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	719	show "x \<cdot> n \<cdot> inv x \<in> N" by (simp add: x n closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	720	show "x \<cdot> n \<in> {x \<cdot> n \<cdot> inv x \<cdot> x}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	721	by (simp add: x n m_assoc sb [THEN subsetD])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	722	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	723	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	724	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	725	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	726	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	727
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	728
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	729	subsection{More Properties of Cosets}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	730
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	731	lemma (in group) l_coset_subset_G:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	732	"\<lbrakk>H \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk> \<Longrightarrow> x <# H \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	733	by (auto simp add: l_coset_def subsetD)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	734
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	735	lemma (in group) l_coset_swap:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	736	"\<lbrakk>y \<in> x <# H; x \<in> carrier(G); subgroup(H,G)\<rbrakk> \<Longrightarrow> x \<in> y <# H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	737	proof (simp add: l_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	738	assume "\<exists>h\<in>H. y = x \<cdot> h"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	739	and x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	740	and sb: "subgroup(H,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	741	then obtain h' where h': "h' \<in> H & x \<cdot> h' = y" by blast
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	742	show "\<exists>h\<in>H. x = y \<cdot> h"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	743	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	744	show "x = y \<cdot> inv h'" using h' x sb
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	745	by (auto simp add: m_assoc subgroup.subset [THEN subsetD])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	746	show "inv h' \<in> H" using h' sb
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	747	by (auto simp add: subgroup.subset [THEN subsetD] subgroup.m_inv_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	748	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	749	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	750
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	751	lemma (in group) l_coset_carrier:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	752	"\<lbrakk>y \<in> x <# H; x \<in> carrier(G); subgroup(H,G)\<rbrakk> \<Longrightarrow> y \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	753	by (auto simp add: l_coset_def m_assoc
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	754	subgroup.subset [THEN subsetD] subgroup.m_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	755
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	756	lemma (in group) l_repr_imp_subset:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	757	assumes y: "y \<in> x <# H" and x: "x \<in> carrier(G)" and sb: "subgroup(H,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	758	shows "y <# H \<subseteq> x <# H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	759	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	760	from y
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	761	obtain h' where "h' \<in> H" "x \<cdot> h' = y" by (auto simp add: l_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	762	thus ?thesis using x sb
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	763	by (auto simp add: l_coset_def m_assoc
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	764	subgroup.subset [THEN subsetD] subgroup.m_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	765	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	766
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	767	lemma (in group) l_repr_independence:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	768	assumes y: "y \<in> x <# H" and x: "x \<in> carrier(G)" and sb: "subgroup(H,G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	769	shows "x <# H = y <# H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	770	proof
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	771	show "x <# H \<subseteq> y <# H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	772	by (rule l_repr_imp_subset,
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	773	(blast intro: l_coset_swap l_coset_carrier y x sb)+)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	774	show "y <# H \<subseteq> x <# H" by (rule l_repr_imp_subset [OF y x sb])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	775	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	776
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	777	lemma (in group) setmult_subset_G:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	778	"\<lbrakk>H \<subseteq> carrier(G); K \<subseteq> carrier(G)\<rbrakk> \<Longrightarrow> H <#> K \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	779	by (auto simp add: set_mult_def subsetD)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	780
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	781	lemma (in group) subgroup_mult_id: "subgroup(H,G) \<Longrightarrow> H <#> H = H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	782	apply (rule equalityI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	783	apply (auto simp add: subgroup.m_closed set_mult_def Sigma_def image_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	784	apply (rule_tac x = x in bexI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	785	apply (rule bexI [of _ "\<one>"])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	786	apply (auto simp add: subgroup.m_closed subgroup.one_closed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	787	r_one subgroup.subset [THEN subsetD])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	788	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	789
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	790
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	791	subsubsection {* Set of inverses of an @{text r_coset}. *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	792
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	793	lemma (in normal) rcos_inv:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	794	assumes x: "x \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	795	shows "set_inv (H #> x) = H #> (inv x)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	796	proof (simp add: r_coset_def SET_INV_def x inv_mult_group, safe intro!: equalityI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	797	fix h
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	798	assume "h \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	799	show "inv x \<cdot> inv h \<in> (\<Union>j\<in>H. {j \<cdot> inv x})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	800	proof (rule UN_I)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	801	show "inv x \<cdot> inv h \<cdot> x \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	802	by (simp add: inv_op_closed1 prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	803	show "inv x \<cdot> inv h \<in> {inv x \<cdot> inv h \<cdot> x \<cdot> inv x}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	804	by (simp add: prems m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	805	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	806	next
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	807	fix h
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	808	assume "h \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	809	show "h \<cdot> inv x \<in> (\<Union>j\<in>H. {inv x \<cdot> inv j})"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	810	proof (rule UN_I)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	811	show "x \<cdot> inv h \<cdot> inv x \<in> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	812	by (simp add: inv_op_closed2 prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	813	show "h \<cdot> inv x \<in> {inv x \<cdot> inv (x \<cdot> inv h \<cdot> inv x)}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	814	by (simp add: prems m_assoc [symmetric] inv_mult_group)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	815	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	816	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	817
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	818
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	819
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	820	subsubsection {Theorems for @{text "<#>"} with @{text "#>"} or @{text "<#"}.}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	821
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	822	lemma (in group) setmult_rcos_assoc:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	823	"\<lbrakk>H \<subseteq> carrier(G); K \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	824	\<Longrightarrow> H <#> (K #> x) = (H <#> K) #> x"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	825	by (force simp add: r_coset_def set_mult_def m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	826
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	827	lemma (in group) rcos_assoc_lcos:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	828	"\<lbrakk>H \<subseteq> carrier(G); K \<subseteq> carrier(G); x \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	829	\<Longrightarrow> (H #> x) <#> K = H <#> (x <# K)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	830	by (force simp add: r_coset_def l_coset_def set_mult_def m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	831
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	832	lemma (in normal) rcos_mult_step1:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	833	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	834	\<Longrightarrow> (H #> x) <#> (H #> y) = (H <#> (x <# H)) #> y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	835	by (simp add: setmult_rcos_assoc subset
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	836	r_coset_subset_G l_coset_subset_G rcos_assoc_lcos)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	837
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	838	lemma (in normal) rcos_mult_step2:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	839	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	840	\<Longrightarrow> (H <#> (x <# H)) #> y = (H <#> (H #> x)) #> y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	841	by (insert coset_eq, simp add: normal_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	842
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	843	lemma (in normal) rcos_mult_step3:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	844	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	845	\<Longrightarrow> (H <#> (H #> x)) #> y = H #> (x \<cdot> y)"
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	846	by (simp add: setmult_rcos_assoc coset_mult_assoc
fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	847	subgroup_mult_id subset prems normal.axioms)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	848
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	849	lemma (in normal) rcos_sum:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	850	"\<lbrakk>x \<in> carrier(G); y \<in> carrier(G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	851	\<Longrightarrow> (H #> x) <#> (H #> y) = H #> (x \<cdot> y)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	852	by (simp add: rcos_mult_step1 rcos_mult_step2 rcos_mult_step3)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	853
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	854	lemma (in normal) rcosets_mult_eq: "M \<in> rcosets H \<Longrightarrow> H <#> M = M"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	855	-- {* generalizes @{text subgroup_mult_id} *}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	856	by (auto simp add: RCOSETS_def subset
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	857	setmult_rcos_assoc subgroup_mult_id prems normal.axioms)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	858
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	859
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	860	subsubsection{Two distinct right cosets are disjoint}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	861
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	862	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	863	r_congruent :: "[i,i] => i" ("rcong\<index> _" [60] 60) where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	864	"rcong\<^bsub>G\<^esub> H == {<x,y> \<in> carrier(G) * carrier(G). inv\<^bsub>G\<^esub> x \<cdot>\<^bsub>G\<^esub> y \<in> H}"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	865
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	866
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	867	lemma (in subgroup) equiv_rcong:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	868	assumes "group(G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	869	shows "equiv (carrier(G), rcong H)"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	870	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	871	interpret group G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	872	show ?thesis proof (simp add: equiv_def, intro conjI)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	873	show "rcong H \<subseteq> carrier(G) \<times> carrier(G)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	874	by (auto simp add: r_congruent_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	875	next
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	876	show "refl (carrier(G), rcong H)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	877	by (auto simp add: r_congruent_def refl_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	878	next
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	879	show "sym (rcong H)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	880	proof (simp add: r_congruent_def sym_def, clarify)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	881	fix x y
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	882	assume [simp]: "x \<in> carrier(G)" "y \<in> carrier(G)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 29223 diff changeset	883	and "inv x \<cdot> y \<in> H"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	884	hence "inv (inv x \<cdot> y) \<in> H" by (simp add: m_inv_closed)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	885	thus "inv y \<cdot> x \<in> H" by (simp add: inv_mult_group)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	886	qed
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	887	next
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	888	show "trans (rcong H)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	889	proof (simp add: r_congruent_def trans_def, clarify)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	890	fix x y z
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	891	assume [simp]: "x \<in> carrier(G)" "y \<in> carrier(G)" "z \<in> carrier(G)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 29223 diff changeset	892	and "inv x \<cdot> y \<in> H" and "inv y \<cdot> z \<in> H"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	893	hence "(inv x \<cdot> y) \<cdot> (inv y \<cdot> z) \<in> H" by simp
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	894	hence "inv x \<cdot> (y \<cdot> inv y) \<cdot> z \<in> H" by (simp add: m_assoc del: inv)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	895	thus "inv x \<cdot> z \<in> H" by simp
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	896	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	897	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	898	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	899
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	900	text{*Equivalence classes of @{text rcong} correspond to left cosets.
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	901	Was there a mistake in the definitions? I'd have expected them to
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	902	correspond to right cosets.*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	903	lemma (in subgroup) l_coset_eq_rcong:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	904	assumes "group(G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	905	assumes a: "a \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	906	shows "a <# H = (rcong H) `` {a}"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	907	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	908	interpret group G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	909	show ?thesis
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	910	by (force simp add: r_congruent_def l_coset_def m_assoc [symmetric] a
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	911	Collect_image_eq)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	912	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	913
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	914	lemma (in group) rcos_equation:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	915	assumes "subgroup(H, G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	916	shows
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	917	"\<lbrakk>ha \<cdot> a = h \<cdot> b; a \<in> carrier(G); b \<in> carrier(G);
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	918	h \<in> H; ha \<in> H; hb \<in> H\<rbrakk>
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	919	\<Longrightarrow> hb \<cdot> a \<in> (\<Union>h\<in>H. {h \<cdot> b})" (is "PROP ?P")
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	920	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	921	interpret subgroup H G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	922	show "PROP ?P"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	923	apply (rule UN_I [of "hb \<cdot> ((inv ha) \<cdot> h)"], simp)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	924	apply (simp add: m_assoc transpose_inv)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	925	done
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	926	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	927
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	928	lemma (in group) rcos_disjoint:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	929	assumes "subgroup(H, G)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	930	shows "\<lbrakk>a \<in> rcosets H; b \<in> rcosets H; a\<noteq>b\<rbrakk> \<Longrightarrow> a \<inter> b = 0" (is "PROP ?P")
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	931	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	932	interpret subgroup H G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	933	show "PROP ?P"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	934	apply (simp add: RCOSETS_def r_coset_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	935	apply (blast intro: rcos_equation prems sym)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	936	done
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	937	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	938
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	939
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	940	subsection {Order of a Group and Lagrange's Theorem}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	941
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	942	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	943	order :: "i => i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	944	"order(S) == \|carrier(S)\|"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	945
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	946	lemma (in group) rcos_self:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	947	assumes "subgroup(H, G)"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	948	shows "x \<in> carrier(G) \<Longrightarrow> x \<in> H #> x" (is "PROP ?P")
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	949	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	950	interpret subgroup H G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	951	show "PROP ?P"
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	952	apply (simp add: r_coset_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	953	apply (rule_tac x="\<one>" in bexI) apply (auto)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	954	done
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	955	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	956
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	957	lemma (in group) rcosets_part_G:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	958	assumes "subgroup(H, G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	959	shows "\<Union>(rcosets H) = carrier(G)"
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	960	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	961	interpret subgroup H G by fact
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	962	show ?thesis
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	963	apply (rule equalityI)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	964	apply (force simp add: RCOSETS_def r_coset_def)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	965	apply (auto simp add: RCOSETS_def intro: rcos_self prems)
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	966	done
72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	967	qed
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	968
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	969	lemma (in group) cosets_finite:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	970	"\<lbrakk>c \<in> rcosets H; H \<subseteq> carrier(G); Finite (carrier(G))\<rbrakk> \<Longrightarrow> Finite(c)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	971	apply (auto simp add: RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	972	apply (simp add: r_coset_subset_G [THEN subset_Finite])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	973	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	974
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	975	text{*More general than the HOL version, which also requires @{term G} to
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	976	be finite.*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	977	lemma (in group) card_cosets_equal:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	978	assumes H: "H \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	979	shows "c \<in> rcosets H \<Longrightarrow> \|c\| = \|H\|"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	980	proof (simp add: RCOSETS_def, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	981	fix a
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	982	assume a: "a \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	983	show "\|H #> a\| = \|H\|"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	984	proof (rule eqpollI [THEN cardinal_cong])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	985	show "H #> a \<lesssim> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	986	proof (simp add: lepoll_def, intro exI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	987	show "(\<lambda>y \<in> H#>a. y \<cdot> inv a) \<in> inj(H #> a, H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	988	by (auto intro: lam_type
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	989	simp add: inj_def r_coset_def m_assoc subsetD [OF H] a)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	990	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	991	show "H \<lesssim> H #> a"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	992	proof (simp add: lepoll_def, intro exI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	993	show "(\<lambda>y\<in> H. y \<cdot> a) \<in> inj(H, H #> a)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	994	by (auto intro: lam_type
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	995	simp add: inj_def r_coset_def subsetD [OF H] a)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	996	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	997	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	998	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	999
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1000
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1001	lemma (in group) rcosets_subset_PowG:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1002	"subgroup(H,G) \<Longrightarrow> rcosets H \<subseteq> Pow(carrier(G))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1003	apply (simp add: RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1004	apply (blast dest: r_coset_subset_G subgroup.subset)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1005	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1006
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1007	theorem (in group) lagrange:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1008	"\<lbrakk>Finite(carrier(G)); subgroup(H,G)\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1009	\<Longrightarrow> \|rcosets H\| #* \|H\| = order(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1010	apply (simp (no_asm_simp) add: order_def rcosets_part_G [symmetric])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1011	apply (subst mult_commute)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1012	apply (rule card_partition)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1013	apply (simp add: rcosets_subset_PowG [THEN subset_Finite])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1014	apply (simp add: rcosets_part_G)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1015	apply (simp add: card_cosets_equal [OF subgroup.subset])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1016	apply (simp add: rcos_disjoint)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1017	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1018
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1019
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1020	subsection {Quotient Groups: Factorization of a Group}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1021
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	1022	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1023	FactGroup :: "[i,i] => i" (infixl "Mod" 65) where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1024	--{Actually defined for groups rather than monoids}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1025	"G Mod H ==
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	1026	<rcosets\<^bsub>G\<^esub> H, \<lambda><K1,K2> \<in> (rcosets\<^bsub>G\<^esub> H) \<times> (rcosets\<^bsub>G\<^esub> H). K1 <#>\<^bsub>G\<^esub> K2, H, 0>"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1027
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1028	lemma (in normal) setmult_closed:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1029	"\<lbrakk>K1 \<in> rcosets H; K2 \<in> rcosets H\<rbrakk> \<Longrightarrow> K1 <#> K2 \<in> rcosets H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1030	by (auto simp add: rcos_sum RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1031
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1032	lemma (in normal) setinv_closed:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1033	"K \<in> rcosets H \<Longrightarrow> set_inv K \<in> rcosets H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1034	by (auto simp add: rcos_inv RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1035
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1036	lemma (in normal) rcosets_assoc:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1037	"\<lbrakk>M1 \<in> rcosets H; M2 \<in> rcosets H; M3 \<in> rcosets H\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1038	\<Longrightarrow> M1 <#> M2 <#> M3 = M1 <#> (M2 <#> M3)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1039	by (auto simp add: RCOSETS_def rcos_sum m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1040
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1041	lemma (in subgroup) subgroup_in_rcosets:
27618 72fe9939a2ab Removed uses of context element includes. ballarin parents: 26199 diff changeset	1042	assumes "group(G)"
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1043	shows "H \<in> rcosets H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1044	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 27618 diff changeset	1045	interpret group G by fact
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1046	have "H #> \<one> = H"
26199 04817a8802f2 explicit referencing of background facts; wenzelm parents: 22931 diff changeset	1047	using _ subgroup_axioms by (rule coset_join2) simp_all
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1048	then show ?thesis
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1049	by (auto simp add: RCOSETS_def intro: sym)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1050	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1051
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1052	lemma (in normal) rcosets_inv_mult_group_eq:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1053	"M \<in> rcosets H \<Longrightarrow> set_inv M <#> M = H"
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 16417 diff changeset	1054	by (auto simp add: RCOSETS_def rcos_inv rcos_sum subgroup.subset prems normal.axioms)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1055
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1056	theorem (in normal) factorgroup_is_group:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1057	"group (G Mod H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1058	apply (simp add: FactGroup_def)
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	1059	apply (rule groupI)
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1060	apply (simp add: setmult_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1061	apply (simp add: normal_imp_subgroup subgroup_in_rcosets)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1062	apply (simp add: setmult_closed rcosets_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1063	apply (simp add: normal_imp_subgroup
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1064	subgroup_in_rcosets rcosets_mult_eq)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1065	apply (auto dest: rcosets_inv_mult_group_eq simp add: setinv_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1066	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1067
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1068	lemma (in normal) inv_FactGroup:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1069	"X \<in> carrier (G Mod H) \<Longrightarrow> inv\<^bsub>G Mod H\<^esub> X = set_inv X"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1070	apply (rule group.inv_equality [OF factorgroup_is_group])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1071	apply (simp_all add: FactGroup_def setinv_closed rcosets_inv_mult_group_eq)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1072	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1073
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1074	text{*The coset map is a homomorphism from @{term G} to the quotient group
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1075	@{term "G Mod H"}*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1076	lemma (in normal) r_coset_hom_Mod:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1077	"(\<lambda>a \<in> carrier(G). H #> a) \<in> hom(G, G Mod H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1078	by (auto simp add: FactGroup_def RCOSETS_def hom_def rcos_sum intro: lam_type)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1079
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1080
14891 f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	1081	subsection{The First Isomorphism Theorem}
f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	1082
f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	1083	text{*The quotient by the kernel of a homomorphism is isomorphic to the
f2e9f7d813af fixed the groupI ambiguity paulson parents: 14884 diff changeset	1084	range of that homomorphism.*}
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1085
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 19931 diff changeset	1086	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21233 diff changeset	1087	kernel :: "[i,i,i] => i" where
14884 0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1088	--{the kernel of a homomorphism}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1089	"kernel(G,H,h) == {x \<in> carrier(G). h ` x = \<one>\<^bsub>H\<^esub>}";
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1090
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1091	lemma (in group_hom) subgroup_kernel: "subgroup (kernel(G,H,h), G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1092	apply (rule subgroup.intro)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1093	apply (auto simp add: kernel_def group.intro prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1094	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1095
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1096	text{The kernel of a homomorphism is a normal subgroup}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1097	lemma (in group_hom) normal_kernel: "(kernel(G,H,h)) \<lhd> G"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1098	apply (simp add: group.normal_inv_iff subgroup_kernel group.intro prems)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1099	apply (simp add: kernel_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1100	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1101
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1102	lemma (in group_hom) FactGroup_nonempty:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1103	assumes X: "X \<in> carrier (G Mod kernel(G,H,h))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1104	shows "X \<noteq> 0"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1105	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1106	from X
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1107	obtain g where "g \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1108	and "X = kernel(G,H,h) #> g"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1109	by (auto simp add: FactGroup_def RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1110	thus ?thesis
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1111	by (auto simp add: kernel_def r_coset_def image_def intro: hom_one)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1112	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1113
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1114
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1115	lemma (in group_hom) FactGroup_contents_mem:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1116	assumes X: "X \<in> carrier (G Mod (kernel(G,H,h)))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1117	shows "contents (h``X) \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1118	proof -
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1119	from X
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1120	obtain g where g: "g \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1121	and "X = kernel(G,H,h) #> g"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1122	by (auto simp add: FactGroup_def RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1123	hence "h `` X = {h ` g}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1124	by (auto simp add: kernel_def r_coset_def image_UN
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1125	image_eq_UN [OF hom_is_fun] g)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1126	thus ?thesis by (auto simp add: g)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1127	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1128
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1129	lemma mult_FactGroup:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1130	"[\|X \<in> carrier(G Mod H); X' \<in> carrier(G Mod H)\|]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1131	==> X \<cdot>\<^bsub>(G Mod H)\<^esub> X' = X <#>\<^bsub>G\<^esub> X'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1132	by (simp add: FactGroup_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1133
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1134	lemma (in normal) FactGroup_m_closed:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1135	"[\|X \<in> carrier(G Mod H); X' \<in> carrier(G Mod H)\|]
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1136	==> X <#>\<^bsub>G\<^esub> X' \<in> carrier(G Mod H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1137	by (simp add: FactGroup_def setmult_closed)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1138
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1139	lemma (in group_hom) FactGroup_hom:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1140	"(\<lambda>X \<in> carrier(G Mod (kernel(G,H,h))). contents (h``X))
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1141	\<in> hom (G Mod (kernel(G,H,h)), H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1142	proof (simp add: hom_def FactGroup_contents_mem lam_type mult_FactGroup normal.FactGroup_m_closed [OF normal_kernel], intro ballI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1143	fix X and X'
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1144	assume X: "X \<in> carrier (G Mod kernel(G,H,h))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1145	and X': "X' \<in> carrier (G Mod kernel(G,H,h))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1146	then
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1147	obtain g and g'
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1148	where "g \<in> carrier(G)" and "g' \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1149	and "X = kernel(G,H,h) #> g" and "X' = kernel(G,H,h) #> g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1150	by (auto simp add: FactGroup_def RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1151	hence all: "\<forall>x\<in>X. h ` x = h ` g" "\<forall>x\<in>X'. h ` x = h ` g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1152	and Xsub: "X \<subseteq> carrier(G)" and X'sub: "X' \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1153	by (force simp add: kernel_def r_coset_def image_def)+
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1154	hence "h `` (X <#> X') = {h ` g \<cdot>\<^bsub>H\<^esub> h ` g'}" using X X'
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1155	by (auto dest!: FactGroup_nonempty
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1156	simp add: set_mult_def image_eq_UN [OF hom_is_fun] image_UN
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1157	subsetD [OF Xsub] subsetD [OF X'sub])
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1158	thus "contents (h `` (X <#> X')) = contents (h `` X) \<cdot>\<^bsub>H\<^esub> contents (h `` X')"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1159	by (simp add: all image_eq_UN [OF hom_is_fun] FactGroup_nonempty
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1160	X X' Xsub X'sub)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1161	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1162
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1163
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1164	text{Lemma for the following injectivity result}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1165	lemma (in group_hom) FactGroup_subset:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1166	"\<lbrakk>g \<in> carrier(G); g' \<in> carrier(G); h ` g = h ` g'\<rbrakk>
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1167	\<Longrightarrow> kernel(G,H,h) #> g \<subseteq> kernel(G,H,h) #> g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1168	apply (clarsimp simp add: kernel_def r_coset_def image_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1169	apply (rename_tac y)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1170	apply (rule_tac x="y \<cdot> g \<cdot> inv g'" in bexI)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1171	apply (simp_all add: G.m_assoc)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1172	done
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1173
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1174	lemma (in group_hom) FactGroup_inj:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1175	"(\<lambda>X\<in>carrier (G Mod kernel(G,H,h)). contents (h `` X))
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1176	\<in> inj(carrier (G Mod kernel(G,H,h)), carrier(H))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1177	proof (simp add: inj_def FactGroup_contents_mem lam_type, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1178	fix X and X'
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1179	assume X: "X \<in> carrier (G Mod kernel(G,H,h))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1180	and X': "X' \<in> carrier (G Mod kernel(G,H,h))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1181	then
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1182	obtain g and g'
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1183	where gX: "g \<in> carrier(G)" "g' \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1184	"X = kernel(G,H,h) #> g" "X' = kernel(G,H,h) #> g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1185	by (auto simp add: FactGroup_def RCOSETS_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1186	hence all: "\<forall>x\<in>X. h ` x = h ` g" "\<forall>x\<in>X'. h ` x = h ` g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1187	and Xsub: "X \<subseteq> carrier(G)" and X'sub: "X' \<subseteq> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1188	by (force simp add: kernel_def r_coset_def image_def)+
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1189	assume "contents (h `` X) = contents (h `` X')"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1190	hence h: "h ` g = h ` g'"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1191	by (simp add: all image_eq_UN [OF hom_is_fun] FactGroup_nonempty
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1192	X X' Xsub X'sub)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1193	show "X=X'" by (rule equalityI) (simp_all add: FactGroup_subset h gX)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1194	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1195
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1196
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1197	lemma (in group_hom) kernel_rcoset_subset:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1198	assumes g: "g \<in> carrier(G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1199	shows "kernel(G,H,h) #> g \<subseteq> carrier (G)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1200	by (auto simp add: g kernel_def r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1201
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1202
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1203
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1204	text{*If the homomorphism @{term h} is onto @{term H}, then so is the
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1205	homomorphism from the quotient group*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1206	lemma (in group_hom) FactGroup_surj:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1207	assumes h: "h \<in> surj(carrier(G), carrier(H))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1208	shows "(\<lambda>X\<in>carrier (G Mod kernel(G,H,h)). contents (h `` X))
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1209	\<in> surj(carrier (G Mod kernel(G,H,h)), carrier(H))"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1210	proof (simp add: surj_def FactGroup_contents_mem lam_type, clarify)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1211	fix y
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1212	assume y: "y \<in> carrier(H)"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1213	with h obtain g where g: "g \<in> carrier(G)" "h ` g = y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1214	by (auto simp add: surj_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1215	hence "(\<Union>x\<in>kernel(G,H,h) #> g. {h ` x}) = {y}"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1216	by (auto simp add: y kernel_def r_coset_def)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1217	with g show "\<exists>x\<in>carrier(G Mod kernel(G, H, h)). contents(h `` x) = y"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1218	--{The witness is @{term "kernel(G,H,h) #> g"}}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1219	by (force simp add: FactGroup_def RCOSETS_def
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1220	image_eq_UN [OF hom_is_fun] kernel_rcoset_subset)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1221	qed
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1222
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1223
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1224	text{*If @{term h} is a homomorphism from @{term G} onto @{term H}, then the
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1225	quotient group @{term "G Mod (kernel(G,H,h))"} is isomorphic to @{term H}.*}
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1226	theorem (in group_hom) FactGroup_iso:
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1227	"h \<in> surj(carrier(G), carrier(H))
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1228	\<Longrightarrow> (\<lambda>X\<in>carrier (G Mod kernel(G,H,h)). contents (h``X)) \<in> (G Mod (kernel(G,H,h))) \<cong> H"
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1229	by (simp add: iso_def FactGroup_hom FactGroup_inj bij_def FactGroup_surj)
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1230
0d7d8b1b3a97 Groups, Rings and supporting lemmas paulson parents: diff changeset	1231	end

author	wenzelm
	Sat, 17 Oct 2009 14:43:18 +0200
changeset 32960	69916a850301
parent 29223	e09c53289830
child 41524	4d2f9a1c24c7
permissions	-rw-r--r--