isabelle: src/HOL/Algebra/QuotRing.thy@b1d955791529 (annotated)

35849 b5522b51cb1e standard headers; wenzelm parents: 35848 diff changeset	1	(* Title: HOL/Algebra/QuotRing.thy
b5522b51cb1e standard headers; wenzelm parents: 35848 diff changeset	2	Author: Stephan Hohe
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	3	*)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	4
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	5	theory QuotRing
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	6	imports RingHom
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	7	begin
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	8
27717 21bbd410ba04 Generalised polynomial lemmas from cring to ring. ballarin parents: 27611 diff changeset	9	section {* Quotient Rings *}
21bbd410ba04 Generalised polynomial lemmas from cring to ring. ballarin parents: 27611 diff changeset	10
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	11	subsection {* Multiplication on Cosets *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	12
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	13	definition rcoset_mult :: "[('a, _) ring_scheme, 'a set, 'a set, 'a set] \<Rightarrow> 'a set"
23463 9953ff53cc64 tuned proofs -- avoid implicit prems; wenzelm parents: 23350 diff changeset	14	("[mod _:] _ \<Otimes>\<index> _" [81,81,81] 80)
35848 5443079512ea slightly more uniform definitions -- eliminated old-style meta-equality; wenzelm parents: 35847 diff changeset	15	where "rcoset_mult R I A B = (\<Union>a\<in>A. \<Union>b\<in>B. I +>\<^bsub>R\<^esub> (a \<otimes>\<^bsub>R\<^esub> b))"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	16
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	17
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	18	text {* @{const "rcoset_mult"} fulfils the properties required by
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	19	congruences *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	20	lemma (in ideal) rcoset_mult_add:
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	21	"x \<in> carrier R \<Longrightarrow> y \<in> carrier R \<Longrightarrow> [mod I:] (I +> x) \<Otimes> (I +> y) = I +> (x \<otimes> y)"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	22	apply rule
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	23	apply (rule, simp add: rcoset_mult_def, clarsimp)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	24	defer 1
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	25	apply (rule, simp add: rcoset_mult_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	26	defer 1
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	27	proof -
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	28	fix z x' y'
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	29	assume carr: "x \<in> carrier R" "y \<in> carrier R"
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	30	and x'rcos: "x' \<in> I +> x"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	31	and y'rcos: "y' \<in> I +> y"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	32	and zrcos: "z \<in> I +> x' \<otimes> y'"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	33
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	34	from x'rcos have "\<exists>h\<in>I. x' = h \<oplus> x"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	35	by (simp add: a_r_coset_def r_coset_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	36	then obtain hx where hxI: "hx \<in> I" and x': "x' = hx \<oplus> x"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	37	by fast+
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	38
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	39	from y'rcos have "\<exists>h\<in>I. y' = h \<oplus> y"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	40	by (simp add: a_r_coset_def r_coset_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	41	then obtain hy where hyI: "hy \<in> I" and y': "y' = hy \<oplus> y"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	42	by fast+
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	43
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	44	from zrcos have "\<exists>h\<in>I. z = h \<oplus> (x' \<otimes> y')"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	45	by (simp add: a_r_coset_def r_coset_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	46	then obtain hz where hzI: "hz \<in> I" and z: "z = hz \<oplus> (x' \<otimes> y')"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	47	by fast+
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	48
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	49	note carr = carr hxI[THEN a_Hcarr] hyI[THEN a_Hcarr] hzI[THEN a_Hcarr]
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	50
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	51	from z have "z = hz \<oplus> (x' \<otimes> y')" .
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	52	also from x' y' have "\<dots> = hz \<oplus> ((hx \<oplus> x) \<otimes> (hy \<oplus> y))" by simp
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	53	also from carr have "\<dots> = (hz \<oplus> (hx \<otimes> (hy \<oplus> y)) \<oplus> x \<otimes> hy) \<oplus> x \<otimes> y" by algebra
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	54	finally have z2: "z = (hz \<oplus> (hx \<otimes> (hy \<oplus> y)) \<oplus> x \<otimes> hy) \<oplus> x \<otimes> y" .
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	55
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	56	from hxI hyI hzI carr have "hz \<oplus> (hx \<otimes> (hy \<oplus> y)) \<oplus> x \<otimes> hy \<in> I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	57	by (simp add: I_l_closed I_r_closed)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	58
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	59	with z2 have "\<exists>h\<in>I. z = h \<oplus> x \<otimes> y" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	60	then show "z \<in> I +> x \<otimes> y" by (simp add: a_r_coset_def r_coset_def)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	61	next
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	62	fix z
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	63	assume xcarr: "x \<in> carrier R"
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	64	and ycarr: "y \<in> carrier R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	65	and zrcos: "z \<in> I +> x \<otimes> y"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	66	from xcarr have xself: "x \<in> I +> x" by (intro a_rcos_self)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	67	from ycarr have yself: "y \<in> I +> y" by (intro a_rcos_self)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	68	show "\<exists>a\<in>I +> x. \<exists>b\<in>I +> y. z \<in> I +> a \<otimes> b"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	69	using xself and yself and zrcos by fast
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	70	qed
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	71
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	72
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	73	subsection {* Quotient Ring Definition *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	74
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	75	definition FactRing :: "[('a,'b) ring_scheme, 'a set] \<Rightarrow> ('a set) ring"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	76	(infixl "Quot" 65)
35848 5443079512ea slightly more uniform definitions -- eliminated old-style meta-equality; wenzelm parents: 35847 diff changeset	77	where "FactRing R I =
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	78	\<lparr>carrier = a_rcosets\<^bsub>R\<^esub> I, mult = rcoset_mult R I,
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	79	one = (I +>\<^bsub>R\<^esub> \<one>\<^bsub>R\<^esub>), zero = I, add = set_add R\<rparr>"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	80
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	81
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	82	subsection {* Factorization over General Ideals *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	83
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	84	text {* The quotient is a ring *}
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	85	lemma (in ideal) quotient_is_ring: "ring (R Quot I)"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	86	apply (rule ringI)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	87	--{* abelian group *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	88	apply (rule comm_group_abelian_groupI)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	89	apply (simp add: FactRing_def)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	90	apply (rule a_factorgroup_is_comm_group[unfolded A_FactGroup_def'])
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	91	--{* mult monoid *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	92	apply (rule monoidI)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	93	apply (simp_all add: FactRing_def A_RCOSETS_def RCOSETS_def
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	94	a_r_coset_def[symmetric])
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	95	--{* mult closed *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	96	apply (clarify)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	97	apply (simp add: rcoset_mult_add, fast)
21502 7f3ea2b3bab6 prefer antiquotations over LaTeX macros; wenzelm parents: 20318 diff changeset	98	--{* mult @{text one_closed} *}
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	99	apply force
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	100	--{* mult assoc *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	101	apply clarify
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	102	apply (simp add: rcoset_mult_add m_assoc)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	103	--{* mult one *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	104	apply clarify
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	105	apply (simp add: rcoset_mult_add)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	106	apply clarify
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	107	apply (simp add: rcoset_mult_add)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	108	--{* distr *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	109	apply clarify
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	110	apply (simp add: rcoset_mult_add a_rcos_sum l_distr)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	111	apply clarify
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	112	apply (simp add: rcoset_mult_add a_rcos_sum r_distr)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	113	done
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	114
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	115
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	116	text {* This is a ring homomorphism *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	117
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	118	lemma (in ideal) rcos_ring_hom: "(op +> I) \<in> ring_hom R (R Quot I)"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	119	apply (rule ring_hom_memI)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	120	apply (simp add: FactRing_def a_rcosetsI[OF a_subset])
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	121	apply (simp add: FactRing_def rcoset_mult_add)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	122	apply (simp add: FactRing_def a_rcos_sum)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	123	apply (simp add: FactRing_def)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	124	done
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	125
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	126	lemma (in ideal) rcos_ring_hom_ring: "ring_hom_ring R (R Quot I) (op +> I)"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	127	apply (rule ring_hom_ringI)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	128	apply (rule is_ring, rule quotient_is_ring)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	129	apply (simp add: FactRing_def a_rcosetsI[OF a_subset])
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	130	apply (simp add: FactRing_def rcoset_mult_add)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	131	apply (simp add: FactRing_def a_rcos_sum)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	132	apply (simp add: FactRing_def)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	133	done
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	134
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	135	text {* The quotient of a cring is also commutative *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	136	lemma (in ideal) quotient_is_cring:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	137	assumes "cring R"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	138	shows "cring (R Quot I)"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	139	proof -
29237 e90d9d51106b More porting to new locales. ballarin parents: 27717 diff changeset	140	interpret cring R by fact
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	141	show ?thesis
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	142	apply (intro cring.intro comm_monoid.intro comm_monoid_axioms.intro)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	143	apply (rule quotient_is_ring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	144	apply (rule ring.axioms[OF quotient_is_ring])
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	145	apply (simp add: FactRing_def A_RCOSETS_defs a_r_coset_def[symmetric])
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	146	apply clarify
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	147	apply (simp add: rcoset_mult_add m_comm)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	148	done
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	149	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	150
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	151	text {* Cosets as a ring homomorphism on crings *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	152	lemma (in ideal) rcos_ring_hom_cring:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	153	assumes "cring R"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	154	shows "ring_hom_cring R (R Quot I) (op +> I)"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	155	proof -
29237 e90d9d51106b More porting to new locales. ballarin parents: 27717 diff changeset	156	interpret cring R by fact
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	157	show ?thesis
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	158	apply (rule ring_hom_cringI)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	159	apply (rule rcos_ring_hom_ring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	160	apply (rule is_cring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	161	apply (rule quotient_is_cring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	162	apply (rule is_cring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	163	done
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	164	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	165
35849 b5522b51cb1e standard headers; wenzelm parents: 35848 diff changeset	166
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	167	subsection {* Factorization over Prime Ideals *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	168
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	169	text {* The quotient ring generated by a prime ideal is a domain *}
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	170	lemma (in primeideal) quotient_is_domain: "domain (R Quot I)"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	171	apply (rule domain.intro)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	172	apply (rule quotient_is_cring, rule is_cring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	173	apply (rule domain_axioms.intro)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	174	apply (simp add: FactRing_def) defer 1
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	175	apply (simp add: FactRing_def A_RCOSETS_defs a_r_coset_def[symmetric], clarify)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	176	apply (simp add: rcoset_mult_add) defer 1
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	177	proof (rule ccontr, clarsimp)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	178	assume "I +> \<one> = I"
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	179	then have "\<one> \<in> I" by (simp only: a_coset_join1 one_closed a_subgroup)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	180	then have "carrier R \<subseteq> I" by (subst one_imp_carrier, simp, fast)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	181	with a_subset have "I = carrier R" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	182	with I_notcarr show False by fast
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	183	next
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	184	fix x y
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	185	assume carr: "x \<in> carrier R" "y \<in> carrier R"
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	186	and a: "I +> x \<otimes> y = I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	187	and b: "I +> y \<noteq> I"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	188
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	189	have ynI: "y \<notin> I"
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	190	proof (rule ccontr, simp)
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	191	assume "y \<in> I"
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	192	then have "I +> y = I" by (rule a_rcos_const)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	193	with b show False by simp
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	194	qed
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	195
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	196	from carr have "x \<otimes> y \<in> I +> x \<otimes> y" by (simp add: a_rcos_self)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	197	then have xyI: "x \<otimes> y \<in> I" by (simp add: a)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	198
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	199	from xyI and carr have xI: "x \<in> I \<or> y \<in> I" by (simp add: I_prime)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	200	with ynI have "x \<in> I" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	201	then show "I +> x = I" by (rule a_rcos_const)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	202	qed
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	203
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	204	text {* Generating right cosets of a prime ideal is a homomorphism
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	205	on commutative rings *}
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	206	lemma (in primeideal) rcos_ring_hom_cring: "ring_hom_cring R (R Quot I) (op +> I)"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	207	by (rule rcos_ring_hom_cring) (rule is_cring)
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	208
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	209
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	210	subsection {* Factorization over Maximal Ideals *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	211
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	212	text {* In a commutative ring, the quotient ring over a maximal ideal
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	213	is a field.
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	214	The proof follows ``W. Adkins, S. Weintraub: Algebra --
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	215	An Approach via Module Theory'' *}
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	216	lemma (in maximalideal) quotient_is_field:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	217	assumes "cring R"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	218	shows "field (R Quot I)"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	219	proof -
29237 e90d9d51106b More porting to new locales. ballarin parents: 27717 diff changeset	220	interpret cring R by fact
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	221	show ?thesis
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	222	apply (intro cring.cring_fieldI2)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	223	apply (rule quotient_is_cring, rule is_cring)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	224	defer 1
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	225	apply (simp add: FactRing_def A_RCOSETS_defs a_r_coset_def[symmetric], clarsimp)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	226	apply (simp add: rcoset_mult_add) defer 1
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	227	proof (rule ccontr, simp)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	228	--{* Quotient is not empty *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	229	assume "\<zero>\<^bsub>R Quot I\<^esub> = \<one>\<^bsub>R Quot I\<^esub>"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	230	then have II1: "I = I +> \<one>" by (simp add: FactRing_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	231	from a_rcos_self[OF one_closed] have "\<one> \<in> I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	232	by (simp add: II1[symmetric])
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	233	then have "I = carrier R" by (rule one_imp_carrier)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	234	with I_notcarr show False by simp
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	235	next
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	236	--{* Existence of Inverse *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	237	fix a
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	238	assume IanI: "I +> a \<noteq> I" and acarr: "a \<in> carrier R"
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	239
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	240	--{* Helper ideal @{text "J"} *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	241	def J \<equiv> "(carrier R #> a) <+> I :: 'a set"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	242	have idealJ: "ideal J R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	243	apply (unfold J_def, rule add_ideals)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	244	apply (simp only: cgenideal_eq_rcos[symmetric], rule cgenideal_ideal, rule acarr)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	245	apply (rule is_ideal)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	246	done
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	247
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	248	--{* Showing @{term "J"} not smaller than @{term "I"} *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	249	have IinJ: "I \<subseteq> J"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	250	proof (rule, simp add: J_def r_coset_def set_add_defs)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	251	fix x
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	252	assume xI: "x \<in> I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	253	have Zcarr: "\<zero> \<in> carrier R" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	254	from xI[THEN a_Hcarr] acarr
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	255	have "x = \<zero> \<otimes> a \<oplus> x" by algebra
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	256	with Zcarr and xI show "\<exists>xa\<in>carrier R. \<exists>k\<in>I. x = xa \<otimes> a \<oplus> k" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	257	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	258
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	259	--{* Showing @{term "J \<noteq> I"} *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	260	have anI: "a \<notin> I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	261	proof (rule ccontr, simp)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	262	assume "a \<in> I"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	263	then have "I +> a = I" by (rule a_rcos_const)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	264	with IanI show False by simp
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	265	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	266
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	267	have aJ: "a \<in> J"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	268	proof (simp add: J_def r_coset_def set_add_defs)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	269	from acarr
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	270	have "a = \<one> \<otimes> a \<oplus> \<zero>" by algebra
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	271	with one_closed and additive_subgroup.zero_closed[OF is_additive_subgroup]
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	272	show "\<exists>x\<in>carrier R. \<exists>k\<in>I. a = x \<otimes> a \<oplus> k" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	273	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	274
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	275	from aJ and anI have JnI: "J \<noteq> I" by fast
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	276
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	277	--{* Deducing @{term "J = carrier R"} because @{term "I"} is maximal *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	278	from idealJ and IinJ have "J = I \<or> J = carrier R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	279	proof (rule I_maximal, unfold J_def)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	280	have "carrier R #> a \<subseteq> carrier R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	281	using subset_refl acarr by (rule r_coset_subset_G)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	282	then show "carrier R #> a <+> I \<subseteq> carrier R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	283	using a_subset by (rule set_add_closed)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	284	qed
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	285
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	286	with JnI have Jcarr: "J = carrier R" by simp
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	287
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	288	--{* Calculating an inverse for @{term "a"} *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	289	from one_closed[folded Jcarr]
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	290	have "\<exists>r\<in>carrier R. \<exists>i\<in>I. \<one> = r \<otimes> a \<oplus> i"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	291	by (simp add: J_def r_coset_def set_add_defs)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	292	then obtain r i where rcarr: "r \<in> carrier R"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	293	and iI: "i \<in> I" and one: "\<one> = r \<otimes> a \<oplus> i" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	294	from one and rcarr and acarr and iI[THEN a_Hcarr]
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	295	have rai1: "a \<otimes> r = \<ominus>i \<oplus> \<one>" by algebra
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	296
45005 0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	297	--{* Lifting to cosets *}
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	298	from iI have "\<ominus>i \<oplus> \<one> \<in> I +> \<one>"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	299	by (intro a_rcosI, simp, intro a_subset, simp)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	300	with rai1 have "a \<otimes> r \<in> I +> \<one>" by simp
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	301	then have "I +> \<one> = I +> a \<otimes> r"
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	302	by (rule a_repr_independence, simp) (rule a_subgroup)
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	303
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	304	from rcarr and this[symmetric]
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	305	show "\<exists>r\<in>carrier R. I +> a \<otimes> r = I +> \<one>" by fast
0d2d59525912 tuned proofs; wenzelm parents: 35849 diff changeset	306	qed
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 23463 diff changeset	307	qed
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	308
0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: diff changeset	309	end

author	haftmann
	Fri, 01 Nov 2013 18:51:14 +0100
changeset 54230	b1d955791529
parent 45005	0d2d59525912
child 61382	efac889fccbc
permissions	-rw-r--r--