isabelle: src/HOL/Library/Permutations.thy@a2eb1bdb9270 (annotated)

41959 b460124855b8 tuned headers; wenzelm parents: 39302 diff changeset	1	(* Title: HOL/Library/Permutations.thy
b460124855b8 tuned headers; wenzelm parents: 39302 diff changeset	2	Author: Amine Chaieb, University of Cambridge
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	3	*)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	4
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	5	header {* Permutations, both general and specifically on finite sets.*}
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	6
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	7	theory Permutations
36335 ceea7e15c04b fix imports huffman parents: 34102 diff changeset	8	imports Parity Fact
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	9	begin
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	10
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	11	subsection {* Transpositions *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	12
56608 8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	13	lemma swap_id_idempotent [simp]:
8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	14	"Fun.swap a b id \<circ> Fun.swap a b id = id"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	15	by (rule ext, auto simp add: Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	16
56608 8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	17	lemma inv_swap_id:
8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	18	"inv (Fun.swap a b id) = Fun.swap a b id"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	19	by (rule inv_unique_comp) simp_all
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	20
56608 8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	21	lemma swap_id_eq:
8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	22	"Fun.swap a b id x = (if x = a then b else if x = b then a else x)"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	23	by (simp add: Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	24
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	25
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	26	subsection {* Basic consequences of the definition *}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	27
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	28	definition permutes (infixr "permutes" 41)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	29	where "(p permutes S) \<longleftrightarrow> (\<forall>x. x \<notin> S \<longrightarrow> p x = x) \<and> (\<forall>y. \<exists>!x. p x = y)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	30
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	31	lemma permutes_in_image: "p permutes S \<Longrightarrow> p x \<in> S \<longleftrightarrow> x \<in> S"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	32	unfolding permutes_def by metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	33
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	34	lemma permutes_image: "p permutes S \<Longrightarrow> p ` S = S"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	35	unfolding permutes_def
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	36	apply (rule set_eqI)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	37	apply (simp add: image_iff)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	38	apply metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	39	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	40
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	41	lemma permutes_inj: "p permutes S \<Longrightarrow> inj p"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	42	unfolding permutes_def inj_on_def by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	43
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	44	lemma permutes_surj: "p permutes s \<Longrightarrow> surj p"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	45	unfolding permutes_def surj_def by metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	46
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	47	lemma permutes_inv_o:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	48	assumes pS: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	49	shows "p \<circ> inv p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	50	and "inv p \<circ> p = id"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	51	using permutes_inj[OF pS] permutes_surj[OF pS]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	52	unfolding inj_iff[symmetric] surj_iff[symmetric] by blast+
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	53
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	54	lemma permutes_inverses:
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	55	fixes p :: "'a \<Rightarrow> 'a"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	56	assumes pS: "p permutes S"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	57	shows "p (inv p x) = x"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	58	and "inv p (p x) = x"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	59	using permutes_inv_o[OF pS, unfolded fun_eq_iff o_def] by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	60
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	61	lemma permutes_subset: "p permutes S \<Longrightarrow> S \<subseteq> T \<Longrightarrow> p permutes T"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	62	unfolding permutes_def by blast
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	63
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	64	lemma permutes_empty[simp]: "p permutes {} \<longleftrightarrow> p = id"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	65	unfolding fun_eq_iff permutes_def by simp metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	66
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	67	lemma permutes_sing[simp]: "p permutes {a} \<longleftrightarrow> p = id"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	68	unfolding fun_eq_iff permutes_def by simp metis
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	69
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	70	lemma permutes_univ: "p permutes UNIV \<longleftrightarrow> (\<forall>y. \<exists>!x. p x = y)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	71	unfolding permutes_def by simp
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	72
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	73	lemma permutes_inv_eq: "p permutes S \<Longrightarrow> inv p y = x \<longleftrightarrow> p x = y"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	74	unfolding permutes_def inv_def
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	75	apply auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	76	apply (erule allE[where x=y])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	77	apply (erule allE[where x=y])
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	78	apply (rule someI_ex)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	79	apply blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	80	apply (rule some1_equality)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	81	apply blast
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	82	apply blast
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	83	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	84
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	85	lemma permutes_swap_id: "a \<in> S \<Longrightarrow> b \<in> S \<Longrightarrow> Fun.swap a b id permutes S"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	86	unfolding permutes_def Fun.swap_def fun_upd_def by auto metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	87
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	88	lemma permutes_superset: "p permutes S \<Longrightarrow> (\<forall>x \<in> S - T. p x = x) \<Longrightarrow> p permutes T"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	89	by (simp add: Ball_def permutes_def) metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	90
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	91
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	92	subsection {* Group properties *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	93
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	94	lemma permutes_id: "id permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	95	unfolding permutes_def by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	96
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	97	lemma permutes_compose: "p permutes S \<Longrightarrow> q permutes S \<Longrightarrow> q \<circ> p permutes S"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	98	unfolding permutes_def o_def by metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	99
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	100	lemma permutes_inv:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	101	assumes pS: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	102	shows "inv p permutes S"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	103	using pS unfolding permutes_def permutes_inv_eq[OF pS] by metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	104
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	105	lemma permutes_inv_inv:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	106	assumes pS: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	107	shows "inv (inv p) = p"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	108	unfolding fun_eq_iff permutes_inv_eq[OF pS] permutes_inv_eq[OF permutes_inv[OF pS]]
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	109	by blast
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	110
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	111
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	112	subsection {* The number of permutations on a finite set *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	113
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	114	lemma permutes_insert_lemma:
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	115	assumes pS: "p permutes (insert a S)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	116	shows "Fun.swap a (p a) id \<circ> p permutes S"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	117	apply (rule permutes_superset[where S = "insert a S"])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	118	apply (rule permutes_compose[OF pS])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	119	apply (rule permutes_swap_id, simp)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	120	using permutes_in_image[OF pS, of a]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	121	apply simp
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	122	apply (auto simp add: Ball_def Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	123	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	124
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	125	lemma permutes_insert: "{p. p permutes (insert a S)} =
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	126	(\<lambda>(b,p). Fun.swap a b id \<circ> p) ` {(b,p). b \<in> insert a S \<and> p \<in> {p. p permutes S}}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	127	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	128	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	129	fix p
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	130	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	131	assume pS: "p permutes insert a S"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	132	let ?b = "p a"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	133	let ?q = "Fun.swap a (p a) id \<circ> p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	134	have th0: "p = Fun.swap a ?b id \<circ> ?q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	135	unfolding fun_eq_iff o_assoc by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	136	have th1: "?b \<in> insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	137	unfolding permutes_in_image[OF pS] by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	138	from permutes_insert_lemma[OF pS] th0 th1
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	139	have "\<exists>b q. p = Fun.swap a b id \<circ> q \<and> b \<in> insert a S \<and> q permutes S" by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	140	}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	141	moreover
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	142	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	143	fix b q
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	144	assume bq: "p = Fun.swap a b id \<circ> q" "b \<in> insert a S" "q permutes S"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	145	from permutes_subset[OF bq(3), of "insert a S"]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	146	have qS: "q permutes insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	147	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	148	have aS: "a \<in> insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	149	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	150	from bq(1) permutes_compose[OF qS permutes_swap_id[OF aS bq(2)]]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	151	have "p permutes insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	152	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	153	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	154	ultimately have "p permutes insert a S \<longleftrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	155	(\<exists>b q. p = Fun.swap a b id \<circ> q \<and> b \<in> insert a S \<and> q permutes S)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	156	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	157	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	158	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	159	by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	160	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	161
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	162	lemma card_permutations:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	163	assumes Sn: "card S = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	164	and fS: "finite S"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	165	shows "card {p. p permutes S} = fact n"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	166	using fS Sn
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	167	proof (induct arbitrary: n)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	168	case empty
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	169	then show ?case by simp
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	170	next
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	171	case (insert x F)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	172	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	173	fix n
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	174	assume H0: "card (insert x F) = n"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	175	let ?xF = "{p. p permutes insert x F}"
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	176	let ?pF = "{p. p permutes F}"
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	177	let ?pF' = "{(b, p). b \<in> insert x F \<and> p \<in> ?pF}"
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	178	let ?g = "(\<lambda>(b, p). Fun.swap x b id \<circ> p)"
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	179	from permutes_insert[of x F]
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	180	have xfgpF': "?xF = ?g ` ?pF'" .
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	181	have Fs: "card F = n - 1"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	182	using `x \<notin> F` H0 `finite F` by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	183	from insert.hyps Fs have pFs: "card ?pF = fact (n - 1)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	184	using `finite F` by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	185	then have "finite ?pF"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	186	using fact_gt_zero_nat by (auto intro: card_ge_0_finite)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	187	then have pF'f: "finite ?pF'"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	188	using H0 `finite F`
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	189	apply (simp only: Collect_split Collect_mem_eq)
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	190	apply (rule finite_cartesian_product)
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	191	apply simp_all
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	192	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	193
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	194	have ginj: "inj_on ?g ?pF'"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	195	proof -
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	196	{
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	197	fix b p c q
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	198	assume bp: "(b,p) \<in> ?pF'"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	199	assume cq: "(c,q) \<in> ?pF'"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	200	assume eq: "?g (b,p) = ?g (c,q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	201	from bp cq have ths: "b \<in> insert x F" "c \<in> insert x F" "x \<in> insert x F"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	202	"p permutes F" "q permutes F"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	203	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	204	from ths(4) `x \<notin> F` eq have "b = ?g (b,p) x"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	205	unfolding permutes_def
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	206	by (auto simp add: Fun.swap_def fun_upd_def fun_eq_iff)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	207	also have "\<dots> = ?g (c,q) x"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	208	using ths(5) `x \<notin> F` eq
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	209	by (auto simp add: swap_def fun_upd_def fun_eq_iff)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	210	also have "\<dots> = c"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	211	using ths(5) `x \<notin> F`
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	212	unfolding permutes_def
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	213	by (auto simp add: Fun.swap_def fun_upd_def fun_eq_iff)
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	214	finally have bc: "b = c" .
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	215	then have "Fun.swap x b id = Fun.swap x c id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	216	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	217	with eq have "Fun.swap x b id \<circ> p = Fun.swap x b id \<circ> q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	218	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	219	then have "Fun.swap x b id \<circ> (Fun.swap x b id \<circ> p) =
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	220	Fun.swap x b id \<circ> (Fun.swap x b id \<circ> q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	221	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	222	then have "p = q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	223	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	224	with bc have "(b, p) = (c, q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	225	by simp
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	226	}
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	227	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	228	unfolding inj_on_def by blast
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	229	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	230	from `x \<notin> F` H0 have n0: "n \<noteq> 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	231	using `finite F` by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	232	then have "\<exists>m. n = Suc m"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	233	by presburger
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	234	then obtain m where n[simp]: "n = Suc m"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	235	by blast
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	236	from pFs H0 have xFc: "card ?xF = fact n"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	237	unfolding xfgpF' card_image[OF ginj]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	238	using `finite F` `finite ?pF`
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	239	apply (simp only: Collect_split Collect_mem_eq card_cartesian_product)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	240	apply simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	241	done
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	242	from finite_imageI[OF pF'f, of ?g] have xFf: "finite ?xF"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	243	unfolding xfgpF' by simp
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	244	have "card ?xF = fact n"
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	245	using xFf xFc unfolding xFf by blast
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	246	}
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	247	then show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	248	using insert by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	249	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	250
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	251	lemma finite_permutations:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	252	assumes fS: "finite S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	253	shows "finite {p. p permutes S}"
33715 8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	254	using card_permutations[OF refl fS] fact_gt_zero_nat
8cce3a34c122 removed hassize predicate hoelzl parents: 33057 diff changeset	255	by (auto intro: card_ge_0_finite)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	256
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	257
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	258	subsection {* Permutations of index set for iterated operations *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	259
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	260	lemma (in comm_monoid_set) permute:
f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	261	assumes "p permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	262	shows "F g S = F (g \<circ> p) S"
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	263	proof -
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	264	from `p permutes S` have "inj p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	265	by (rule permutes_inj)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	266	then have "inj_on p S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	267	by (auto intro: subset_inj_on)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	268	then have "F g (p ` S) = F (g \<circ> p) S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	269	by (rule reindex)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	270	moreover from `p permutes S` have "p ` S = S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	271	by (rule permutes_image)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	272	ultimately show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	273	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	274	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	275
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	276	lemma setsum_permute:
f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	277	assumes "p permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	278	shows "setsum f S = setsum (f \<circ> p) S"
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	279	using assms by (fact setsum.permute)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	280
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	281	lemma setsum_permute_natseg:
f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	282	assumes pS: "p permutes {m .. n}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	283	shows "setsum f {m .. n} = setsum (f \<circ> p) {m .. n}"
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	284	using setsum_permute [OF pS, of f ] pS by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	285
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	286	lemma setprod_permute:
f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	287	assumes "p permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	288	shows "setprod f S = setprod (f \<circ> p) S"
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	289	using assms by (fact setprod.permute)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	290
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	291	lemma setprod_permute_natseg:
f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	292	assumes pS: "p permutes {m .. n}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	293	shows "setprod f {m .. n} = setprod (f \<circ> p) {m .. n}"
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	294	using setprod_permute [OF pS, of f ] pS by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	295
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	296
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	297	subsection {* Various combinations of transpositions with 2, 1 and 0 common elements *}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	298
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	299	lemma swap_id_common:" a \<noteq> c \<Longrightarrow> b \<noteq> c \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	300	Fun.swap a b id \<circ> Fun.swap a c id = Fun.swap b c id \<circ> Fun.swap a b id"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	301	by (simp add: fun_eq_iff Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	302
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	303	lemma swap_id_common': "a \<noteq> b \<Longrightarrow> a \<noteq> c \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	304	Fun.swap a c id \<circ> Fun.swap b c id = Fun.swap b c id \<circ> Fun.swap a b id"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	305	by (simp add: fun_eq_iff Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	306
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	307	lemma swap_id_independent: "a \<noteq> c \<Longrightarrow> a \<noteq> d \<Longrightarrow> b \<noteq> c \<Longrightarrow> b \<noteq> d \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	308	Fun.swap a b id \<circ> Fun.swap c d id = Fun.swap c d id \<circ> Fun.swap a b id"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	309	by (simp add: fun_eq_iff Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	310
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	311
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	312	subsection {* Permutations as transposition sequences *}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	313
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	314	inductive swapidseq :: "nat \<Rightarrow> ('a \<Rightarrow> 'a) \<Rightarrow> bool"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	315	where
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	316	id[simp]: "swapidseq 0 id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	317	\| comp_Suc: "swapidseq n p \<Longrightarrow> a \<noteq> b \<Longrightarrow> swapidseq (Suc n) (Fun.swap a b id \<circ> p)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	318
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	319	declare id[unfolded id_def, simp]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	320
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	321	definition "permutation p \<longleftrightarrow> (\<exists>n. swapidseq n p)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	322
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	323
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	324	subsection {* Some closure properties of the set of permutations, with lengths *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	325
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	326	lemma permutation_id[simp]: "permutation id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	327	unfolding permutation_def by (rule exI[where x=0]) simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	328
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	329	declare permutation_id[unfolded id_def, simp]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	330
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	331	lemma swapidseq_swap: "swapidseq (if a = b then 0 else 1) (Fun.swap a b id)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	332	apply clarsimp
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	333	using comp_Suc[of 0 id a b]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	334	apply simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	335	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	336
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	337	lemma permutation_swap_id: "permutation (Fun.swap a b id)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	338	apply (cases "a = b")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	339	apply simp_all
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	340	unfolding permutation_def
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	341	using swapidseq_swap[of a b]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	342	apply blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	343	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	344
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	345	lemma swapidseq_comp_add: "swapidseq n p \<Longrightarrow> swapidseq m q \<Longrightarrow> swapidseq (n + m) (p \<circ> q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	346	proof (induct n p arbitrary: m q rule: swapidseq.induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	347	case (id m q)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	348	then show ?case by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	349	next
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	350	case (comp_Suc n p a b m q)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	351	have th: "Suc n + m = Suc (n + m)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	352	by arith
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	353	show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	354	unfolding th comp_assoc
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	355	apply (rule swapidseq.comp_Suc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	356	using comp_Suc.hyps(2)[OF comp_Suc.prems] comp_Suc.hyps(3)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	357	apply blast+
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	358	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	359	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	360
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	361	lemma permutation_compose: "permutation p \<Longrightarrow> permutation q \<Longrightarrow> permutation (p \<circ> q)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	362	unfolding permutation_def using swapidseq_comp_add[of _ p _ q] by metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	363
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	364	lemma swapidseq_endswap: "swapidseq n p \<Longrightarrow> a \<noteq> b \<Longrightarrow> swapidseq (Suc n) (p \<circ> Fun.swap a b id)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	365	apply (induct n p rule: swapidseq.induct)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	366	using swapidseq_swap[of a b]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	367	apply (auto simp add: comp_assoc intro: swapidseq.comp_Suc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	368	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	369
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	370	lemma swapidseq_inverse_exists: "swapidseq n p \<Longrightarrow> \<exists>q. swapidseq n q \<and> p \<circ> q = id \<and> q \<circ> p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	371	proof (induct n p rule: swapidseq.induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	372	case id
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	373	then show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	374	by (rule exI[where x=id]) simp
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	375	next
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	376	case (comp_Suc n p a b)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	377	from comp_Suc.hyps obtain q where q: "swapidseq n q" "p \<circ> q = id" "q \<circ> p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	378	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	379	let ?q = "q \<circ> Fun.swap a b id"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	380	note H = comp_Suc.hyps
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	381	from swapidseq_swap[of a b] H(3) have th0: "swapidseq 1 (Fun.swap a b id)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	382	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	383	from swapidseq_comp_add[OF q(1) th0] have th1: "swapidseq (Suc n) ?q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	384	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	385	have "Fun.swap a b id \<circ> p \<circ> ?q = Fun.swap a b id \<circ> (p \<circ> q) \<circ> Fun.swap a b id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	386	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	387	also have "\<dots> = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	388	by (simp add: q(2))
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	389	finally have th2: "Fun.swap a b id \<circ> p \<circ> ?q = id" .
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	390	have "?q \<circ> (Fun.swap a b id \<circ> p) = q \<circ> (Fun.swap a b id \<circ> Fun.swap a b id) \<circ> p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	391	by (simp only: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	392	then have "?q \<circ> (Fun.swap a b id \<circ> p) = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	393	by (simp add: q(3))
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	394	with th1 th2 show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	395	by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	396	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	397
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	398	lemma swapidseq_inverse:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	399	assumes H: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	400	shows "swapidseq n (inv p)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	401	using swapidseq_inverse_exists[OF H] inv_unique_comp[of p] by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	402
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	403	lemma permutation_inverse: "permutation p \<Longrightarrow> permutation (inv p)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	404	using permutation_def swapidseq_inverse by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	405
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	406
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	407	subsection {* The identity map only has even transposition sequences *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	408
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	409	lemma symmetry_lemma:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	410	assumes "\<And>a b c d. P a b c d \<Longrightarrow> P a b d c"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	411	and "\<And>a b c d. a \<noteq> b \<Longrightarrow> c \<noteq> d \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	412	a = c \<and> b = d \<or> a = c \<and> b \<noteq> d \<or> a \<noteq> c \<and> b = d \<or> a \<noteq> c \<and> a \<noteq> d \<and> b \<noteq> c \<and> b \<noteq> d \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	413	P a b c d"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	414	shows "\<And>a b c d. a \<noteq> b \<longrightarrow> c \<noteq> d \<longrightarrow> P a b c d"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	415	using assms by metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	416
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	417	lemma swap_general: "a \<noteq> b \<Longrightarrow> c \<noteq> d \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	418	Fun.swap a b id \<circ> Fun.swap c d id = id \<or>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	419	(\<exists>x y z. x \<noteq> a \<and> y \<noteq> a \<and> z \<noteq> a \<and> x \<noteq> y \<and>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	420	Fun.swap a b id \<circ> Fun.swap c d id = Fun.swap x y id \<circ> Fun.swap a z id)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	421	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	422	assume H: "a \<noteq> b" "c \<noteq> d"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	423	have "a \<noteq> b \<longrightarrow> c \<noteq> d \<longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	424	(Fun.swap a b id \<circ> Fun.swap c d id = id \<or>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	425	(\<exists>x y z. x \<noteq> a \<and> y \<noteq> a \<and> z \<noteq> a \<and> x \<noteq> y \<and>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	426	Fun.swap a b id \<circ> Fun.swap c d id = Fun.swap x y id \<circ> Fun.swap a z id))"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	427	apply (rule symmetry_lemma[where a=a and b=b and c=c and d=d])
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	428	apply (simp_all only: swap_commute)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	429	apply (case_tac "a = c \<and> b = d")
56608 8e3c848008fa more simp rules for Fun.swap haftmann parents: 56545 diff changeset	430	apply (clarsimp simp only: swap_commute swap_id_idempotent)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	431	apply (case_tac "a = c \<and> b \<noteq> d")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	432	apply (rule disjI2)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	433	apply (rule_tac x="b" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	434	apply (rule_tac x="d" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	435	apply (rule_tac x="b" in exI)
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	436	apply (clarsimp simp add: fun_eq_iff Fun.swap_def)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	437	apply (case_tac "a \<noteq> c \<and> b = d")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	438	apply (rule disjI2)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	439	apply (rule_tac x="c" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	440	apply (rule_tac x="d" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	441	apply (rule_tac x="c" in exI)
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	442	apply (clarsimp simp add: fun_eq_iff Fun.swap_def)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	443	apply (rule disjI2)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	444	apply (rule_tac x="c" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	445	apply (rule_tac x="d" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	446	apply (rule_tac x="b" in exI)
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	447	apply (clarsimp simp add: fun_eq_iff Fun.swap_def)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	448	done
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	449	with H show ?thesis by metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	450	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	451
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	452	lemma swapidseq_id_iff[simp]: "swapidseq 0 p \<longleftrightarrow> p = id"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	453	using swapidseq.cases[of 0 p "p = id"]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	454	by auto
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	455
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	456	lemma swapidseq_cases: "swapidseq n p \<longleftrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	457	n = 0 \<and> p = id \<or> (\<exists>a b q m. n = Suc m \<and> p = Fun.swap a b id \<circ> q \<and> swapidseq m q \<and> a \<noteq> b)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	458	apply (rule iffI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	459	apply (erule swapidseq.cases[of n p])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	460	apply simp
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	461	apply (rule disjI2)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	462	apply (rule_tac x= "a" in exI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	463	apply (rule_tac x= "b" in exI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	464	apply (rule_tac x= "pa" in exI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	465	apply (rule_tac x= "na" in exI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	466	apply simp
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	467	apply auto
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	468	apply (rule comp_Suc, simp_all)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	469	done
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	470
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	471	lemma fixing_swapidseq_decrease:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	472	assumes spn: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	473	and ab: "a \<noteq> b"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	474	and pa: "(Fun.swap a b id \<circ> p) a = a"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	475	shows "n \<noteq> 0 \<and> swapidseq (n - 1) (Fun.swap a b id \<circ> p)"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	476	using spn ab pa
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	477	proof (induct n arbitrary: p a b)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	478	case 0
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	479	then show ?case
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	480	by (auto simp add: Fun.swap_def fun_upd_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	481	next
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	482	case (Suc n p a b)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	483	from Suc.prems(1) swapidseq_cases[of "Suc n" p]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	484	obtain c d q m where
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	485	cdqm: "Suc n = Suc m" "p = Fun.swap c d id \<circ> q" "swapidseq m q" "c \<noteq> d" "n = m"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	486	by auto
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	487	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	488	assume H: "Fun.swap a b id \<circ> Fun.swap c d id = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	489	have ?case by (simp only: cdqm o_assoc H) (simp add: cdqm)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	490	}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	491	moreover
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	492	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	493	fix x y z
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	494	assume H: "x \<noteq> a" "y \<noteq> a" "z \<noteq> a" "x \<noteq> y"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	495	"Fun.swap a b id \<circ> Fun.swap c d id = Fun.swap x y id \<circ> Fun.swap a z id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	496	from H have az: "a \<noteq> z"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	497	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	498
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	499	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	500	fix h
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	501	have "(Fun.swap x y id \<circ> h) a = a \<longleftrightarrow> h a = a"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	502	using H by (simp add: Fun.swap_def)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	503	}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	504	note th3 = this
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	505	from cdqm(2) have "Fun.swap a b id \<circ> p = Fun.swap a b id \<circ> (Fun.swap c d id \<circ> q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	506	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	507	then have "Fun.swap a b id \<circ> p = Fun.swap x y id \<circ> (Fun.swap a z id \<circ> q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	508	by (simp add: o_assoc H)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	509	then have "(Fun.swap a b id \<circ> p) a = (Fun.swap x y id \<circ> (Fun.swap a z id \<circ> q)) a"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	510	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	511	then have "(Fun.swap x y id \<circ> (Fun.swap a z id \<circ> q)) a = a"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	512	unfolding Suc by metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	513	then have th1: "(Fun.swap a z id \<circ> q) a = a"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	514	unfolding th3 .
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	515	from Suc.hyps[OF cdqm(3)[ unfolded cdqm(5)[symmetric]] az th1]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	516	have th2: "swapidseq (n - 1) (Fun.swap a z id \<circ> q)" "n \<noteq> 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	517	by blast+
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	518	have th: "Suc n - 1 = Suc (n - 1)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	519	using th2(2) by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	520	have ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	521	unfolding cdqm(2) H o_assoc th
49739 13aa6d8268ec consolidated names of theorems on composition; haftmann parents: 45922 diff changeset	522	apply (simp only: Suc_not_Zero simp_thms comp_assoc)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	523	apply (rule comp_Suc)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	524	using th2 H
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	525	apply blast+
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	526	done
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	527	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	528	ultimately show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	529	using swap_general[OF Suc.prems(2) cdqm(4)] by metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	530	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	531
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	532	lemma swapidseq_identity_even:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	533	assumes "swapidseq n (id :: 'a \<Rightarrow> 'a)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	534	shows "even n"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	535	using `swapidseq n id`
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	536	proof (induct n rule: nat_less_induct)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	537	fix n
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	538	assume H: "\<forall>m<n. swapidseq m (id::'a \<Rightarrow> 'a) \<longrightarrow> even m" "swapidseq n (id :: 'a \<Rightarrow> 'a)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	539	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	540	assume "n = 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	541	then have "even n" by presburger
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	542	}
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	543	moreover
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	544	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	545	fix a b :: 'a and q m
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	546	assume h: "n = Suc m" "(id :: 'a \<Rightarrow> 'a) = Fun.swap a b id \<circ> q" "swapidseq m q" "a \<noteq> b"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	547	from fixing_swapidseq_decrease[OF h(3,4), unfolded h(2)[symmetric]]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	548	have m: "m \<noteq> 0" "swapidseq (m - 1) (id :: 'a \<Rightarrow> 'a)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	549	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	550	from h m have mn: "m - 1 < n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	551	by arith
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	552	from H(1)[rule_format, OF mn m(2)] h(1) m(1) have "even n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	553	by presburger
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	554	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	555	ultimately show "even n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	556	using H(2)[unfolded swapidseq_cases[of n id]] by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	557	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	558
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	559
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	560	subsection {* Therefore we have a welldefined notion of parity *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	561
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	562	definition "evenperm p = even (SOME n. swapidseq n p)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	563
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	564	lemma swapidseq_even_even:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	565	assumes m: "swapidseq m p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	566	and n: "swapidseq n p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	567	shows "even m \<longleftrightarrow> even n"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	568	proof -
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	569	from swapidseq_inverse_exists[OF n]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	570	obtain q where q: "swapidseq n q" "p \<circ> q = id" "q \<circ> p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	571	by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	572	from swapidseq_identity_even[OF swapidseq_comp_add[OF m q(1), unfolded q]]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	573	show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	574	by arith
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	575	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	576
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	577	lemma evenperm_unique:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	578	assumes p: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	579	and n:"even n = b"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	580	shows "evenperm p = b"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	581	unfolding n[symmetric] evenperm_def
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	582	apply (rule swapidseq_even_even[where p = p])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	583	apply (rule someI[where x = n])
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	584	using p
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	585	apply blast+
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	586	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	587
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	588
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	589	subsection {* And it has the expected composition properties *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	590
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	591	lemma evenperm_id[simp]: "evenperm id = True"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	592	by (rule evenperm_unique[where n = 0]) simp_all
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	593
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	594	lemma evenperm_swap: "evenperm (Fun.swap a b id) = (a = b)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	595	by (rule evenperm_unique[where n="if a = b then 0 else 1"]) (simp_all add: swapidseq_swap)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	596
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	597	lemma evenperm_comp:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	598	assumes p: "permutation p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	599	and q:"permutation q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	600	shows "evenperm (p \<circ> q) = (evenperm p = evenperm q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	601	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	602	from p q obtain n m where n: "swapidseq n p" and m: "swapidseq m q"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	603	unfolding permutation_def by blast
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	604	note nm = swapidseq_comp_add[OF n m]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	605	have th: "even (n + m) = (even n \<longleftrightarrow> even m)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	606	by arith
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	607	from evenperm_unique[OF n refl] evenperm_unique[OF m refl]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	608	evenperm_unique[OF nm th]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	609	show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	610	by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	611	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	612
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	613	lemma evenperm_inv:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	614	assumes p: "permutation p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	615	shows "evenperm (inv p) = evenperm p"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	616	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	617	from p obtain n where n: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	618	unfolding permutation_def by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	619	from evenperm_unique[OF swapidseq_inverse[OF n] evenperm_unique[OF n refl, symmetric]]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	620	show ?thesis .
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	621	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	622
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	623
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	624	subsection {* A more abstract characterization of permutations *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	625
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	626	lemma bij_iff: "bij f \<longleftrightarrow> (\<forall>x. \<exists>!y. f y = x)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	627	unfolding bij_def inj_on_def surj_def
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	628	apply auto
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	629	apply metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	630	apply metis
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	631	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	632
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	633	lemma permutation_bijective:
5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	634	assumes p: "permutation p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	635	shows "bij p"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	636	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	637	from p obtain n where n: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	638	unfolding permutation_def by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	639	from swapidseq_inverse_exists[OF n]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	640	obtain q where q: "swapidseq n q" "p \<circ> q = id" "q \<circ> p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	641	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	642	then show ?thesis unfolding bij_iff
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	643	apply (auto simp add: fun_eq_iff)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	644	apply metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	645	done
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	646	qed
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	647
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	648	lemma permutation_finite_support:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	649	assumes p: "permutation p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	650	shows "finite {x. p x \<noteq> x}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	651	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	652	from p obtain n where n: "swapidseq n p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	653	unfolding permutation_def by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	654	from n show ?thesis
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	655	proof (induct n p rule: swapidseq.induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	656	case id
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	657	then show ?case by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	658	next
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	659	case (comp_Suc n p a b)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	660	let ?S = "insert a (insert b {x. p x \<noteq> x})"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	661	from comp_Suc.hyps(2) have fS: "finite ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	662	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	663	from `a \<noteq> b` have th: "{x. (Fun.swap a b id \<circ> p) x \<noteq> x} \<subseteq> ?S"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	664	by (auto simp add: Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	665	from finite_subset[OF th fS] show ?case .
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	666	qed
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	667	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	668
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	669	lemma bij_inv_eq_iff: "bij p \<Longrightarrow> x = inv p y \<longleftrightarrow> p x = y"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	670	using surj_f_inv_f[of p] by (auto simp add: bij_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	671
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	672	lemma bij_swap_comp:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	673	assumes bp: "bij p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	674	shows "Fun.swap a b id \<circ> p = Fun.swap (inv p a) (inv p b) p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	675	using surj_f_inv_f[OF bij_is_surj[OF bp]]
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	676	by (simp add: fun_eq_iff Fun.swap_def bij_inv_eq_iff[OF bp])
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	677
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	678	lemma bij_swap_ompose_bij: "bij p \<Longrightarrow> bij (Fun.swap a b id \<circ> p)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	679	proof -
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	680	assume H: "bij p"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	681	show ?thesis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	682	unfolding bij_swap_comp[OF H] bij_swap_iff
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	683	using H .
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	684	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	685
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	686	lemma permutation_lemma:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	687	assumes fS: "finite S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	688	and p: "bij p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	689	and pS: "\<forall>x. x\<notin> S \<longrightarrow> p x = x"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	690	shows "permutation p"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	691	using fS p pS
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	692	proof (induct S arbitrary: p rule: finite_induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	693	case (empty p)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	694	then show ?case by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	695	next
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	696	case (insert a F p)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	697	let ?r = "Fun.swap a (p a) id \<circ> p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	698	let ?q = "Fun.swap a (p a) id \<circ> ?r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	699	have raa: "?r a = a"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	700	by (simp add: Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	701	from bij_swap_ompose_bij[OF insert(4)]
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	702	have br: "bij ?r" .
5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	703
5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	704	from insert raa have th: "\<forall>x. x \<notin> F \<longrightarrow> ?r x = x"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	705	apply (clarsimp simp add: Fun.swap_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	706	apply (erule_tac x="x" in allE)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	707	apply auto
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	708	unfolding bij_iff
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	709	apply metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	710	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	711	from insert(3)[OF br th]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	712	have rp: "permutation ?r" .
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	713	have "permutation ?q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	714	by (simp add: permutation_compose permutation_swap_id rp)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	715	then show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	716	by (simp add: o_assoc)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	717	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	718
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	719	lemma permutation: "permutation p \<longleftrightarrow> bij p \<and> finite {x. p x \<noteq> x}"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	720	(is "?lhs \<longleftrightarrow> ?b \<and> ?f")
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	721	proof
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	722	assume p: ?lhs
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	723	from p permutation_bijective permutation_finite_support show "?b \<and> ?f"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	724	by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	725	next
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	726	assume "?b \<and> ?f"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	727	then have "?f" "?b" by blast+
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	728	from permutation_lemma[OF this] show ?lhs
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	729	by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	730	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	731
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	732	lemma permutation_inverse_works:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	733	assumes p: "permutation p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	734	shows "inv p \<circ> p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	735	and "p \<circ> inv p = id"
44227 78e033e8ba05 get Library/Permutations.thy compiled and working again huffman parents: 41959 diff changeset	736	using permutation_bijective [OF p]
78e033e8ba05 get Library/Permutations.thy compiled and working again huffman parents: 41959 diff changeset	737	unfolding bij_def inj_iff surj_iff by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	738
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	739	lemma permutation_inverse_compose:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	740	assumes p: "permutation p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	741	and q: "permutation q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	742	shows "inv (p \<circ> q) = inv q \<circ> inv p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	743	proof -
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	744	note ps = permutation_inverse_works[OF p]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	745	note qs = permutation_inverse_works[OF q]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	746	have "p \<circ> q \<circ> (inv q \<circ> inv p) = p \<circ> (q \<circ> inv q) \<circ> inv p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	747	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	748	also have "\<dots> = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	749	by (simp add: ps qs)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	750	finally have th0: "p \<circ> q \<circ> (inv q \<circ> inv p) = id" .
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	751	have "inv q \<circ> inv p \<circ> (p \<circ> q) = inv q \<circ> (inv p \<circ> p) \<circ> q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	752	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	753	also have "\<dots> = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	754	by (simp add: ps qs)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	755	finally have th1: "inv q \<circ> inv p \<circ> (p \<circ> q) = id" .
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	756	from inv_unique_comp[OF th0 th1] show ?thesis .
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	757	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	758
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	759
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	760	subsection {* Relation to "permutes" *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	761
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	762	lemma permutation_permutes: "permutation p \<longleftrightarrow> (\<exists>S. finite S \<and> p permutes S)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	763	unfolding permutation permutes_def bij_iff[symmetric]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	764	apply (rule iffI, clarify)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	765	apply (rule exI[where x="{x. p x \<noteq> x}"])
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	766	apply simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	767	apply clarsimp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	768	apply (rule_tac B="S" in finite_subset)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	769	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	770	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	771
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	772
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	773	subsection {* Hence a sort of induction principle composing by swaps *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	774
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	775	lemma permutes_induct: "finite S \<Longrightarrow> P id \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	776	(\<And> a b p. a \<in> S \<Longrightarrow> b \<in> S \<Longrightarrow> P p \<Longrightarrow> P p \<Longrightarrow> permutation p \<Longrightarrow> P (Fun.swap a b id \<circ> p)) \<Longrightarrow>
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	777	(\<And>p. p permutes S \<Longrightarrow> P p)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	778	proof (induct S rule: finite_induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	779	case empty
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	780	then show ?case by auto
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	781	next
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	782	case (insert x F p)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	783	let ?r = "Fun.swap x (p x) id \<circ> p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	784	let ?q = "Fun.swap x (p x) id \<circ> ?r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	785	have qp: "?q = p"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	786	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	787	from permutes_insert_lemma[OF insert.prems(3)] insert have Pr: "P ?r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	788	by blast
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	789	from permutes_in_image[OF insert.prems(3), of x]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	790	have pxF: "p x \<in> insert x F"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	791	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	792	have xF: "x \<in> insert x F"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	793	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	794	have rp: "permutation ?r"
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	795	unfolding permutation_permutes using insert.hyps(1)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	796	permutes_insert_lemma[OF insert.prems(3)]
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	797	by blast
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	798	from insert.prems(2)[OF xF pxF Pr Pr rp]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	799	show ?case
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	800	unfolding qp .
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	801	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	802
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	803
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	804	subsection {* Sign of a permutation as a real number *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	805
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	806	definition "sign p = (if evenperm p then (1::int) else -1)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	807
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	808	lemma sign_nz: "sign p \<noteq> 0"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	809	by (simp add: sign_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	810
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	811	lemma sign_id: "sign id = 1"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	812	by (simp add: sign_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	813
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	814	lemma sign_inverse: "permutation p \<Longrightarrow> sign (inv p) = sign p"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	815	by (simp add: sign_def evenperm_inv)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	816
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	817	lemma sign_compose: "permutation p \<Longrightarrow> permutation q \<Longrightarrow> sign (p \<circ> q) = sign p * sign q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	818	by (simp add: sign_def evenperm_comp)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	819
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	820	lemma sign_swap_id: "sign (Fun.swap a b id) = (if a = b then 1 else -1)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	821	by (simp add: sign_def evenperm_swap)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	822
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	823	lemma sign_idempotent: "sign p * sign p = 1"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	824	by (simp add: sign_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	825
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	826
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	827	subsection {* More lemmas about permutations *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	828
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	829	lemma permutes_natset_le:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	830	fixes S :: "'a::wellorder set"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	831	assumes p: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	832	and le: "\<forall>i \<in> S. p i \<le> i"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	833	shows "p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	834	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	835	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	836	fix n
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	837	have "p n = n"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	838	using p le
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	839	proof (induct n arbitrary: S rule: less_induct)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	840	fix n S
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	841	assume H:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	842	"\<And>m S. m < n \<Longrightarrow> p permutes S \<Longrightarrow> \<forall>i\<in>S. p i \<le> i \<Longrightarrow> p m = m"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	843	"p permutes S" "\<forall>i \<in>S. p i \<le> i"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	844	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	845	assume "n \<notin> S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	846	with H(2) have "p n = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	847	unfolding permutes_def by metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	848	}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	849	moreover
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	850	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	851	assume ns: "n \<in> S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	852	from H(3) ns have "p n < n \<or> p n = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	853	by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	854	moreover {
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	855	assume h: "p n < n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	856	from H h have "p (p n) = p n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	857	by metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	858	with permutes_inj[OF H(2)] have "p n = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	859	unfolding inj_on_def by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	860	with h have False
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	861	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	862	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	863	ultimately have "p n = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	864	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	865	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	866	ultimately show "p n = n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	867	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	868	qed
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	869	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	870	then show ?thesis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	871	by (auto simp add: fun_eq_iff)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	872	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	873
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	874	lemma permutes_natset_ge:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	875	fixes S :: "'a::wellorder set"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	876	assumes p: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	877	and le: "\<forall>i \<in> S. p i \<ge> i"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	878	shows "p = id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	879	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	880	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	881	fix i
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	882	assume i: "i \<in> S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	883	from i permutes_in_image[OF permutes_inv[OF p]] have "inv p i \<in> S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	884	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	885	with le have "p (inv p i) \<ge> inv p i"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	886	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	887	with permutes_inverses[OF p] have "i \<ge> inv p i"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	888	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	889	}
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	890	then have th: "\<forall>i\<in>S. inv p i \<le> i"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	891	by blast
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	892	from permutes_natset_le[OF permutes_inv[OF p] th]
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	893	have "inv p = inv id"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	894	by simp
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	895	then show ?thesis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	896	apply (subst permutes_inv_inv[OF p, symmetric])
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	897	apply (rule inv_unique_comp)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	898	apply simp_all
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	899	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	900	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	901
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	902	lemma image_inverse_permutations: "{inv p \|p. p permutes S} = {p. p permutes S}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	903	apply (rule set_eqI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	904	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	905	using permutes_inv_inv permutes_inv
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	906	apply auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	907	apply (rule_tac x="inv x" in exI)
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	908	apply auto
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	909	done
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	910
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	911	lemma image_compose_permutations_left:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	912	assumes q: "q permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	913	shows "{q \<circ> p \| p. p permutes S} = {p . p permutes S}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	914	apply (rule set_eqI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	915	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	916	apply (rule permutes_compose)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	917	using q
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	918	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	919	apply (rule_tac x = "inv q \<circ> x" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	920	apply (simp add: o_assoc permutes_inv permutes_compose permutes_inv_o)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	921	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	922
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	923	lemma image_compose_permutations_right:
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	924	assumes q: "q permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	925	shows "{p \<circ> q \| p. p permutes S} = {p . p permutes S}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	926	apply (rule set_eqI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	927	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	928	apply (rule permutes_compose)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	929	using q
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	930	apply auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	931	apply (rule_tac x = "x \<circ> inv q" in exI)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	932	apply (simp add: o_assoc permutes_inv permutes_compose permutes_inv_o comp_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	933	done
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	934
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	935	lemma permutes_in_seg: "p permutes {1 ..n} \<Longrightarrow> i \<in> {1..n} \<Longrightarrow> 1 \<le> p i \<and> p i \<le> n"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	936	by (simp add: permutes_def) metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	937
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	938	lemma setsum_permutations_inverse:
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	939	"setsum f {p. p permutes S} = setsum (\<lambda>p. f(inv p)) {p. p permutes S}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	940	(is "?lhs = ?rhs")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	941	proof -
30036 3a074e3a9a18 generalize some lemmas huffman parents: 29840 diff changeset	942	let ?S = "{p . p permutes S}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	943	have th0: "inj_on inv ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	944	proof (auto simp add: inj_on_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	945	fix q r
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	946	assume q: "q permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	947	and r: "r permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	948	and qr: "inv q = inv r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	949	then have "inv (inv q) = inv (inv r)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	950	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	951	with permutes_inv_inv[OF q] permutes_inv_inv[OF r] show "q = r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	952	by metis
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	953	qed
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	954	have th1: "inv ` ?S = ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	955	using image_inverse_permutations by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	956	have th2: "?rhs = setsum (f \<circ> inv) ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	957	by (simp add: o_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	958	from setsum_reindex[OF th0, of f] show ?thesis unfolding th1 th2 .
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	959	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	960
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	961	lemma setum_permutations_compose_left:
30036 3a074e3a9a18 generalize some lemmas huffman parents: 29840 diff changeset	962	assumes q: "q permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	963	shows "setsum f {p. p permutes S} = setsum (\<lambda>p. f(q \<circ> p)) {p. p permutes S}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	964	(is "?lhs = ?rhs")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	965	proof -
30036 3a074e3a9a18 generalize some lemmas huffman parents: 29840 diff changeset	966	let ?S = "{p. p permutes S}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	967	have th0: "?rhs = setsum (f \<circ> (op \<circ> q)) ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	968	by (simp add: o_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	969	have th1: "inj_on (op \<circ> q) ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	970	proof (auto simp add: inj_on_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	971	fix p r
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	972	assume "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	973	and r: "r permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	974	and rp: "q \<circ> p = q \<circ> r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	975	then have "inv q \<circ> q \<circ> p = inv q \<circ> q \<circ> r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	976	by (simp add: comp_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	977	with permutes_inj[OF q, unfolded inj_iff] show "p = r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	978	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	979	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	980	have th3: "(op \<circ> q) ` ?S = ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	981	using image_compose_permutations_left[OF q] by auto
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	982	from setsum_reindex[OF th1, of f] show ?thesis unfolding th0 th1 th3 .
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	983	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	984
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	985	lemma sum_permutations_compose_right:
30036 3a074e3a9a18 generalize some lemmas huffman parents: 29840 diff changeset	986	assumes q: "q permutes S"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	987	shows "setsum f {p. p permutes S} = setsum (\<lambda>p. f(p \<circ> q)) {p. p permutes S}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	988	(is "?lhs = ?rhs")
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	989	proof -
30036 3a074e3a9a18 generalize some lemmas huffman parents: 29840 diff changeset	990	let ?S = "{p. p permutes S}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	991	have th0: "?rhs = setsum (f \<circ> (\<lambda>p. p \<circ> q)) ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	992	by (simp add: o_def)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	993	have th1: "inj_on (\<lambda>p. p \<circ> q) ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	994	proof (auto simp add: inj_on_def)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	995	fix p r
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	996	assume "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	997	and r: "r permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	998	and rp: "p \<circ> q = r \<circ> q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	999	then have "p \<circ> (q \<circ> inv q) = r \<circ> (q \<circ> inv q)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1000	by (simp add: o_assoc)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1001	with permutes_surj[OF q, unfolded surj_iff] show "p = r"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1002	by simp
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1003	qed
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1004	have th3: "(\<lambda>p. p \<circ> q) ` ?S = ?S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1005	using image_compose_permutations_right[OF q] by auto
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1006	from setsum_reindex[OF th1, of f]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1007	show ?thesis unfolding th0 th1 th3 .
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1008	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1009
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1010
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1011	subsection {* Sum over a set of permutations (could generalize to iteration) *}
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1012
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1013	lemma setsum_over_permutations_insert:
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1014	assumes fS: "finite S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1015	and aS: "a \<notin> S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1016	shows "setsum f {p. p permutes (insert a S)} =
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1017	setsum (\<lambda>b. setsum (\<lambda>q. f (Fun.swap a b id \<circ> q)) {p. p permutes S}) (insert a S)"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1018	proof -
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1019	have th0: "\<And>f a b. (\<lambda>(b,p). f (Fun.swap a b id \<circ> p)) = f \<circ> (\<lambda>(b,p). Fun.swap a b id \<circ> p)"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1020	by (simp add: fun_eq_iff)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1021	have th1: "\<And>P Q. P \<times> Q = {(a,b). a \<in> P \<and> b \<in> Q}"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1022	by blast
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1023	have th2: "\<And>P Q. P \<Longrightarrow> (P \<Longrightarrow> Q) \<Longrightarrow> P \<and> Q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1024	by blast
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	1025	show ?thesis
5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	1026	unfolding permutes_insert
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1027	unfolding setsum_cartesian_product
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1028	unfolding th1[symmetric]
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1029	unfolding th0
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1030	proof (rule setsum_reindex)
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1031	let ?f = "(\<lambda>(b, y). Fun.swap a b id \<circ> y)"
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1032	let ?P = "{p. p permutes S}"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1033	{
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1034	fix b c p q
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1035	assume b: "b \<in> insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1036	assume c: "c \<in> insert a S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1037	assume p: "p permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1038	assume q: "q permutes S"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1039	assume eq: "Fun.swap a b id \<circ> p = Fun.swap a c id \<circ> q"
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1040	from p q aS have pa: "p a = a" and qa: "q a = a"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	1041	unfolding permutes_def by metis+
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1042	from eq have "(Fun.swap a b id \<circ> p) a = (Fun.swap a c id \<circ> q) a"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1043	by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1044	then have bc: "b = c"
56545 8f1e7596deb7 more operations and lemmas haftmann parents: 54681 diff changeset	1045	by (simp add: permutes_def pa qa o_def fun_upd_def Fun.swap_def id_def
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1046	cong del: if_weak_cong split: split_if_asm)
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1047	from eq[unfolded bc] have "(\<lambda>p. Fun.swap a c id \<circ> p) (Fun.swap a c id \<circ> p) =
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1048	(\<lambda>p. Fun.swap a c id \<circ> p) (Fun.swap a c id \<circ> q)" by simp
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1049	then have "p = q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1050	unfolding o_assoc swap_id_idempotent
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32456 diff changeset	1051	by (simp add: o_def)
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1052	with bc have "b = c \<and> p = q"
8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1053	by blast
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1054	}
30488 5c4c3a9e9102 remove trailing spaces huffman parents: 30267 diff changeset	1055	then show "inj_on ?f (insert a S \<times> ?P)"
54681 8a8e6db7f391 tuned proofs; wenzelm parents: 53374 diff changeset	1056	unfolding inj_on_def by clarify metis
29840 cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1057	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1058	qed
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1059
cfab6a76aa13 Permutations, both general and specifically on finite sets. chaieb parents: diff changeset	1060	end
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49739 diff changeset	1061

author	haftmann
	Fri, 30 May 2014 08:23:07 +0200
changeset 57117	a2eb1bdb9270
parent 56608	8e3c848008fa
child 57129	7edb7550663e
permissions	-rw-r--r--