isabelle: src/HOL/Algebra/Sylow.thy@94703573e0af (annotated)

14706 71590b7733b7 tuned document; wenzelm parents: 14666 diff changeset	1	(* Title: HOL/Algebra/Sylow.thy
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	2	Author: Florian Kammueller, with new proofs by L C Paulson
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	3	*)
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	4
35849 b5522b51cb1e standard headers; wenzelm parents: 33657 diff changeset	5	theory Sylow
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	6	imports Coset Exponent
35849 b5522b51cb1e standard headers; wenzelm parents: 33657 diff changeset	7	begin
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	8
76987 4c275405faae isabelle update -u cite; wenzelm parents: 69597 diff changeset	9	text \<open>See also \<^cite>\<open>"Kammueller-Paulson:1999"\<close>.\<close>
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	10
69272 15e9ed5b28fb isabelle update_cartouches -t; wenzelm parents: 68561 diff changeset	11	text \<open>The combinatorial argument is in theory \<open>Exponent\<close>.\<close>
14706 71590b7733b7 tuned document; wenzelm parents: 14666 diff changeset	12
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	13	lemma le_extend_mult: "\<lbrakk>0 < c; a \<le> b\<rbrakk> \<Longrightarrow> a \<le> b * c" for c :: nat
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	14	using gr0_conv_Suc by fastforce
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	15
14747 2eaff69d3d10 removal of locale coset paulson parents: 14706 diff changeset	16	locale sylow = group +
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	17	fixes p and a and m and calM and RelM
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	18	assumes prime_p: "prime p"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	19	and order_G: "order G = (p^a) * m"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	20	and finite_G[iff]: "finite (carrier G)"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	21	defines "calM \<equiv> {s. s \<subseteq> carrier G \<and> card s = p^a}"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	22	and "RelM \<equiv> {(N1, N2). N1 \<in> calM \<and> N2 \<in> calM \<and> (\<exists>g \<in> carrier G. N1 = N2 #> g)}"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	23	begin
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	24
80067 c40bdfc84640 tuned proofs of Equiv_Relations.equiv desharna parents: 76987 diff changeset	25	lemma RelM_subset: "RelM \<subseteq> calM \<times> calM"
c40bdfc84640 tuned proofs of Equiv_Relations.equiv desharna parents: 76987 diff changeset	26	by (auto simp only: RelM_def)
c40bdfc84640 tuned proofs of Equiv_Relations.equiv desharna parents: 76987 diff changeset	27
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	28	lemma RelM_refl_on: "refl_on calM RelM"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	29	by (auto simp: refl_on_def RelM_def calM_def) (blast intro!: coset_mult_one [symmetric])
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	30
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	31	lemma RelM_sym: "sym RelM"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	32	unfolding sym_def RelM_def calM_def
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	33	using coset_mult_assoc coset_mult_one r_inv_ex
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	34	by (smt (verit, best) case_prod_conv mem_Collect_eq)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	35
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	36	lemma RelM_trans: "trans RelM"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	37	by (auto simp add: trans_def RelM_def calM_def coset_mult_assoc)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	38
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	39	lemma RelM_equiv: "equiv calM RelM"
80067 c40bdfc84640 tuned proofs of Equiv_Relations.equiv desharna parents: 76987 diff changeset	40	using RelM_subset RelM_refl_on RelM_sym RelM_trans by (intro equivI)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	41
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	42	lemma M_subset_calM_prep: "M' \<in> calM // RelM \<Longrightarrow> M' \<subseteq> calM"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	43	unfolding RelM_def by (blast elim!: quotientE)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	44
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	45	end
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: 16663 diff changeset	46
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	47	subsection \<open>Main Part of the Proof\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	48
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	49	locale sylow_central = sylow +
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	50	fixes H and M1 and M
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	51	assumes M_in_quot: "M \<in> calM // RelM"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	52	and not_dvd_M: "\<not> (p ^ Suc (multiplicity p m) dvd card M)"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	53	and M1_in_M: "M1 \<in> M"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	54	defines "H \<equiv> {g. g \<in> carrier G \<and> M1 #> g = M1}"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	55	begin
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	56
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	57	lemma M_subset_calM: "M \<subseteq> calM"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	58	by (simp add: M_in_quot M_subset_calM_prep)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	59
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	60	lemma card_M1: "card M1 = p^a"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	61	using M1_in_M M_subset_calM calM_def by blast
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	62
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	63	lemma exists_x_in_M1: "\<exists>x. x \<in> M1"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	64	using prime_p [THEN prime_gt_Suc_0_nat] card_M1 one_in_subset by fastforce
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	65
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	66	lemma M1_subset_G [simp]: "M1 \<subseteq> carrier G"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	67	using M1_in_M M_subset_calM calM_def mem_Collect_eq subsetCE by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	68
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	69	lemma M1_inj_H: "\<exists>f \<in> H\<rightarrow>M1. inj_on f H"
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	70	proof -
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	71	from exists_x_in_M1 obtain m1 where m1M: "m1 \<in> M1"..
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	72	show ?thesis
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	73	proof
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	74	have "m1 \<in> carrier G"
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	75	by (simp add: m1M M1_subset_G [THEN subsetD])
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	76	then show "inj_on (\<lambda>z\<in>H. m1 \<otimes> z) H"
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	77	by (simp add: H_def inj_on_def)
67399 eab6ce8368fa ran isabelle update_op on all sources nipkow parents: 64914 diff changeset	78	show "restrict ((\<otimes>) m1) H \<in> H \<rightarrow> M1"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	79	using H_def m1M rcosI by auto
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	80	qed
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	81	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	82
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	83	end
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	84
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	85
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	86	subsection \<open>Discharging the Assumptions of \<open>sylow_central\<close>\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	87
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	88	context sylow
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	89	begin
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	90
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	91	lemma EmptyNotInEquivSet: "{} \<notin> calM // RelM"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	92	using RelM_equiv in_quotient_imp_non_empty by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	93
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	94	lemma existsM1inM: "M \<in> calM // RelM \<Longrightarrow> \<exists>M1. M1 \<in> M"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	95	using RelM_equiv equiv_Eps_in by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	96
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	97	lemma zero_less_o_G: "0 < order G"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	98	by (simp add: order_def card_gt_0_iff carrier_not_empty)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	99
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	100	lemma zero_less_m: "m > 0"
2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	101	using zero_less_o_G by (simp add: order_G)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	102
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	103	lemma card_calM: "card calM = (p^a) * m choose p^a"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	104	by (simp add: calM_def n_subsets order_G [symmetric] order_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	105
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	106	lemma zero_less_card_calM: "card calM > 0"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	107	by (simp add: card_calM zero_less_binomial le_extend_mult zero_less_m)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	108
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	109	lemma max_p_div_calM: "\<not> (p ^ Suc (multiplicity p m) dvd card calM)"
63534 523b488b15c9 Overhaul of prime/multiplicity/prime_factors eberlm <eberlm@in.tum.de> parents: 63167 diff changeset	110	proof
523b488b15c9 Overhaul of prime/multiplicity/prime_factors eberlm <eberlm@in.tum.de> parents: 63167 diff changeset	111	assume "p ^ Suc (multiplicity p m) dvd card calM"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	112	with zero_less_card_calM prime_p
63534 523b488b15c9 Overhaul of prime/multiplicity/prime_factors eberlm <eberlm@in.tum.de> parents: 63167 diff changeset	113	have "Suc (multiplicity p m) \<le> multiplicity p (card calM)"
523b488b15c9 Overhaul of prime/multiplicity/prime_factors eberlm <eberlm@in.tum.de> parents: 63167 diff changeset	114	by (intro multiplicity_geI) auto
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	115	then show False
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	116	by (simp add: card_calM const_p_fac prime_p zero_less_m)
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	117	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	118
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	119	lemma finite_calM: "finite calM"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	120	unfolding calM_def by (rule finite_subset [where B = "Pow (carrier G)"]) auto
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	121
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	122	lemma lemma_A1: "\<exists>M \<in> calM // RelM. \<not> (p ^ Suc (multiplicity p m) dvd card M)"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	123	using RelM_equiv equiv_imp_dvd_card finite_calM max_p_div_calM by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	124
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	125	end
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	126
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	127
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	128	subsubsection \<open>Introduction and Destruct Rules for \<open>H\<close>\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	129
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	130	context sylow_central
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	131	begin
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	132
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	133	lemma H_I: "\<lbrakk>g \<in> carrier G; M1 #> g = M1\<rbrakk> \<Longrightarrow> g \<in> H"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	134	by (simp add: H_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	135
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	136	lemma H_into_carrier_G: "x \<in> H \<Longrightarrow> x \<in> carrier G"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	137	by (simp add: H_def)
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	138
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	139	lemma in_H_imp_eq: "g \<in> H \<Longrightarrow> M1 #> g = M1"
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	140	by (simp add: H_def)
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	141
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	142	lemma H_m_closed: "\<lbrakk>x \<in> H; y \<in> H\<rbrakk> \<Longrightarrow> x \<otimes> y \<in> H"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	143	by (simp add: H_def coset_mult_assoc [symmetric])
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	144
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	145	lemma H_not_empty: "H \<noteq> {}"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	146	by (force simp add: H_def intro: exI [of _ \<one>])
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	147
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	148	lemma H_is_subgroup: "subgroup H G"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	149	proof (rule subgroupI)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	150	show "H \<subseteq> carrier G"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	151	using H_into_carrier_G by blast
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	152	show "\<And>a. a \<in> H \<Longrightarrow> inv a \<in> H"
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	153	by (metis H_I H_into_carrier_G M1_subset_G coset_mult_assoc coset_mult_one in_H_imp_eq inv_closed r_inv)
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	154	show "\<And>a b. \<lbrakk>a \<in> H; b \<in> H\<rbrakk> \<Longrightarrow> a \<otimes> b \<in> H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	155	by (blast intro: H_m_closed)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	156	qed (use H_not_empty in auto)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	157
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	158	lemma rcosetGM1g_subset_G: "\<lbrakk>g \<in> carrier G; x \<in> M1 #> g\<rbrakk> \<Longrightarrow> x \<in> carrier G"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	159	by (blast intro: M1_subset_G [THEN r_coset_subset_G, THEN subsetD])
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	160
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	161	lemma finite_M1: "finite M1"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	162	by (rule finite_subset [OF M1_subset_G finite_G])
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	163
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	164	lemma finite_rcosetGM1g: "g \<in> carrier G \<Longrightarrow> finite (M1 #> g)"
62410 2fc7a8d9c529 partial tidy-up of Sylow's theorem paulson <lp15@cam.ac.uk> parents: 61382 diff changeset	165	using rcosetGM1g_subset_G finite_G M1_subset_G cosets_finite rcosetsI by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	166
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	167	lemma M1_cardeq_rcosetGM1g: "g \<in> carrier G \<Longrightarrow> card (M1 #> g) = card M1"
68443 43055b016688 New material from Martin Baillon and Paulo Emílio de Vilhena paulson <lp15@cam.ac.uk> parents: 68399 diff changeset	168	by (metis M1_subset_G card_rcosets_equal rcosetsI)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	169
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	170	lemma M1_RelM_rcosetGM1g:
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	171	assumes "g \<in> carrier G"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	172	shows "(M1, M1 #> g) \<in> RelM"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	173	proof -
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	174	have "M1 #> g \<subseteq> carrier G"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	175	by (simp add: assms r_coset_subset_G)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	176	moreover have "card (M1 #> g) = p ^ a"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	177	using assms by (simp add: card_M1 M1_cardeq_rcosetGM1g)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	178	moreover have "\<exists>h\<in>carrier G. M1 = M1 #> g #> h"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	179	by (metis assms M1_subset_G coset_mult_assoc coset_mult_one r_inv_ex)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	180	ultimately show ?thesis
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	181	by (simp add: RelM_def calM_def card_M1)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	182	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	183
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	184	end
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	185
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	186
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	187	subsection \<open>Equal Cardinalities of \<open>M\<close> and the Set of Cosets\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	188
69597 ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 69272 diff changeset	189	text \<open>Injections between \<^term>\<open>M\<close> and \<^term>\<open>rcosets\<^bsub>G\<^esub> H\<close> show that
61382 efac889fccbc isabelle update_cartouches; wenzelm parents: 59807 diff changeset	190	their cardinalities are equal.\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	191
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	192	lemma ElemClassEquiv: "\<lbrakk>equiv A r; C \<in> A // r\<rbrakk> \<Longrightarrow> \<forall>x \<in> C. \<forall>y \<in> C. (x, y) \<in> r"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	193	unfolding equiv_def quotient_def sym_def trans_def by blast
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	194
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	195	context sylow_central
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	196	begin
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	197
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	198	lemma M_elem_map: "M2 \<in> M \<Longrightarrow> \<exists>g. g \<in> carrier G \<and> M1 #> g = M2"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	199	using M1_in_M M_in_quot [THEN RelM_equiv [THEN ElemClassEquiv]]
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	200	by (simp add: RelM_def) (blast dest!: bspec)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	201
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	202	lemmas M_elem_map_carrier = M_elem_map [THEN someI_ex, THEN conjunct1]
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	203
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	204	lemmas M_elem_map_eq = M_elem_map [THEN someI_ex, THEN conjunct2]
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	205
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	206	lemma M_funcset_rcosets_H:
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	207	"(\<lambda>x\<in>M. H #> (SOME g. g \<in> carrier G \<and> M1 #> g = x)) \<in> M \<rightarrow> rcosets H"
68445 c183a6a69f2d reorganisation of Algebra: new material from Baillon and Vilhena, removal of duplicate names, elimination of "More_" theories paulson <lp15@cam.ac.uk> parents: 68443 diff changeset	208	by (metis (lifting) H_is_subgroup M_elem_map_carrier rcosetsI restrictI subgroup.subset)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	209
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	210	lemma inj_M_GmodH: "\<exists>f \<in> M \<rightarrow> rcosets H. inj_on f M"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	211	proof
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	212	let ?inv = "\<lambda>x. SOME g. g \<in> carrier G \<and> M1 #> g = x"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	213	show "inj_on (\<lambda>x\<in>M. H #> ?inv x) M"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	214	proof (rule inj_onI, simp)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	215	fix x y
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	216	assume eq: "H #> ?inv x = H #> ?inv y" and xy: "x \<in> M" "y \<in> M"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	217	have "x = M1 #> ?inv x"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	218	by (simp add: M_elem_map_eq \<open>x \<in> M\<close>)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	219	also have "\<dots> = M1 #> ?inv y"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	220	proof (rule coset_mult_inv1 [OF in_H_imp_eq [OF coset_join1]])
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	221	show "H #> ?inv x \<otimes> inv (?inv y) = H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	222	by (simp add: H_into_carrier_G M_elem_map_carrier xy coset_mult_inv2 eq subsetI)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	223	qed (simp_all add: H_is_subgroup M_elem_map_carrier xy)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	224	also have "\<dots> = y"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	225	using M_elem_map_eq \<open>y \<in> M\<close> by simp
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	226	finally show "x=y" .
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	227	qed
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	228	show "(\<lambda>x\<in>M. H #> ?inv x) \<in> M \<rightarrow> rcosets H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	229	by (rule M_funcset_rcosets_H)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	230	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	231
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	232	end
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	233
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	234
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	235	subsubsection \<open>The Opposite Injection\<close>
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	236
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	237	context sylow_central
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	238	begin
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	239
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	240	lemma H_elem_map: "H1 \<in> rcosets H \<Longrightarrow> \<exists>g. g \<in> carrier G \<and> H #> g = H1"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	241	by (auto simp: RCOSETS_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	242
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	243	lemmas H_elem_map_carrier = H_elem_map [THEN someI_ex, THEN conjunct1]
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	244
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	245	lemmas H_elem_map_eq = H_elem_map [THEN someI_ex, THEN conjunct2]
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	246
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	247	lemma rcosets_H_funcset_M:
67613 ce654b0e6d69 more symbols; wenzelm parents: 67399 diff changeset	248	"(\<lambda>C \<in> rcosets H. M1 #> (SOME g. g \<in> carrier G \<and> H #> g = C)) \<in> rcosets H \<rightarrow> M"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	249	using in_quotient_imp_closed [OF RelM_equiv M_in_quot _ M1_RelM_rcosetGM1g]
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	250	by (simp add: M1_in_M H_elem_map_carrier RCOSETS_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	251
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	252	lemma inj_GmodH_M: "\<exists>g \<in> rcosets H\<rightarrow>M. inj_on g (rcosets H)"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	253	proof
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	254	let ?inv = "\<lambda>x. SOME g. g \<in> carrier G \<and> H #> g = x"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	255	show "inj_on (\<lambda>C\<in>rcosets H. M1 #> ?inv C) (rcosets H)"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	256	proof (rule inj_onI, simp)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	257	fix x y
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	258	assume eq: "M1 #> ?inv x = M1 #> ?inv y" and xy: "x \<in> rcosets H" "y \<in> rcosets H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	259	have "x = H #> ?inv x"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	260	by (simp add: H_elem_map_eq \<open>x \<in> rcosets H\<close>)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	261	also have "\<dots> = H #> ?inv y"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	262	proof (rule coset_mult_inv1 [OF coset_join2])
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	263	show "?inv x \<otimes> inv (?inv y) \<in> carrier G"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	264	by (simp add: H_elem_map_carrier \<open>x \<in> rcosets H\<close> \<open>y \<in> rcosets H\<close>)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	265	then show "(?inv x) \<otimes> inv (?inv y) \<in> H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	266	by (simp add: H_I H_elem_map_carrier xy coset_mult_inv2 eq)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	267	show "H \<subseteq> carrier G"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	268	by (simp add: H_is_subgroup subgroup.subset)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	269	qed (simp_all add: H_is_subgroup H_elem_map_carrier xy)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	270	also have "\<dots> = y"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	271	by (simp add: H_elem_map_eq \<open>y \<in> rcosets H\<close>)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	272	finally show "x=y" .
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	273	qed
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	274	show "(\<lambda>C\<in>rcosets H. M1 #> ?inv C) \<in> rcosets H \<rightarrow> M"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	275	using rcosets_H_funcset_M by blast
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	276	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	277
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	278	lemma calM_subset_PowG: "calM \<subseteq> Pow (carrier G)"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	279	by (auto simp: calM_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	280
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	281
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	282	lemma finite_M: "finite M"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	283	by (metis M_subset_calM finite_calM rev_finite_subset)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	284
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	285	lemma cardMeqIndexH: "card M = card (rcosets H)"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	286	using inj_M_GmodH inj_GmodH_M
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	287	by (metis H_is_subgroup card_bij finite_G finite_M finite_UnionD rcosets_part_G)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	288
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	289	lemma index_lem: "card M * card H = order G"
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	290	by (simp add: cardMeqIndexH lagrange H_is_subgroup)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	291
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	292	lemma card_H_eq: "card H = p^a"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	293	proof (rule antisym)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	294	show "p^a \<le> card H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	295	proof (rule dvd_imp_le)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	296	have "p ^ (a + multiplicity p m) dvd card M * card H"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	297	by (simp add: index_lem multiplicity_dvd order_G power_add)
80400 898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	298	then show "p ^ a dvd card H"
898034c8a799 Tidied some messy proofs paulson <lp15@cam.ac.uk> parents: 80067 diff changeset	299	using div_combine not_dvd_M prime_p by blast
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	300	show "0 < card H"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	301	by (blast intro: subgroup.finite_imp_card_positive H_is_subgroup)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	302	qed
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	303	next
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	304	show "card H \<le> p^a"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	305	using M1_inj_H card_M1 card_inj finite_M1 by fastforce
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	306	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	307
64914 51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	308	end
51f015bd4565 prefer context groups; wenzelm parents: 64912 diff changeset	309
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	310	lemma (in sylow) sylow_thm: "\<exists>H. subgroup H G \<and> card H = p^a"
68488 dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	311	proof -
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	312	obtain M where M: "M \<in> calM // RelM" "\<not> (p ^ Suc (multiplicity p m) dvd card M)"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	313	using lemma_A1 by blast
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	314	then obtain M1 where "M1 \<in> M"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	315	by (metis existsM1inM)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	316	define H where "H \<equiv> {g. g \<in> carrier G \<and> M1 #> g = M1}"
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	317	with M \<open>M1 \<in> M\<close>
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	318	interpret sylow_central G p a m calM RelM H M1 M
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	319	by unfold_locales (auto simp add: H_def calM_def RelM_def)
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	320	show ?thesis
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	321	using H_is_subgroup card_H_eq by blast
dfbd80c3d180 more modernisaton and de-applying paulson <lp15@cam.ac.uk> parents: 68484 diff changeset	322	qed
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	323
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	324	text \<open>Needed because the locale's automatic definition refers to
69597 ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 69272 diff changeset	325	\<^term>\<open>semigroup G\<close> and \<^term>\<open>group_axioms G\<close> rather than
ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 69272 diff changeset	326	simply to \<^term>\<open>group G\<close>.\<close>
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	327	lemma sylow_eq: "sylow G p a m \<longleftrightarrow> group G \<and> sylow_axioms G p a m"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	328	by (simp add: sylow_def group_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	329
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: 16663 diff changeset	330
61382 efac889fccbc isabelle update_cartouches; wenzelm parents: 59807 diff changeset	331	subsection \<open>Sylow's Theorem\<close>
20318 0e0ea63fe768 Restructured algebra library, added ideals and quotient rings. ballarin parents: 16663 diff changeset	332
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	333	theorem sylow_thm:
64912 68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	334	"\<lbrakk>prime p; group G; order G = (p^a) * m; finite (carrier G)\<rbrakk>
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	335	\<Longrightarrow> \<exists>H. subgroup H G \<and> card H = p^a"
68f0465d956b misc tuning and modernization; wenzelm parents: 63537 diff changeset	336	by (rule sylow.sylow_thm [of G p a m]) (simp add: sylow_eq sylow_axioms_def)
13870 cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	337
cf947d1ec5ff moved Exponent, Coset, Sylow from GroupTheory to Algebra, converting them paulson parents: diff changeset	338	end

author	wenzelm
	Thu, 25 Jul 2024 10:30:22 +0200
changeset 80616	94703573e0af
parent 80400	898034c8a799
permissions	-rw-r--r--