isabelle: src/HOL/Finite_Set.thy@c2583bbb92f5 (annotated)

12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1	(* Title: HOL/Finite_Set.thy
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	2	Author: Tobias Nipkow, Lawrence C Paulson and Markus Wenzel
16775 c1b87ef4a1c3 added lemmas to OrderedGroup.thy (reasoning about signs, absolute value, triangle inequalities) avigad parents: 16760 diff changeset	3	with contributions by Jeremy Avigad
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	4	*)
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	5
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	6	header {* Finite sets *}
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	7
15131 c69542757a4d New theory header syntax. nipkow parents: 15124 diff changeset	8	theory Finite_Set
38400 9bfcb1507c6b import swap prevents strange failure of SML code generator for datatypes haftmann parents: 37770 diff changeset	9	imports Option Power
15131 c69542757a4d New theory header syntax. nipkow parents: 15124 diff changeset	10	begin
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	11
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	12	subsection {* Predicate for finite sets *}
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	13
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	14	inductive finite :: "'a set \<Rightarrow> bool"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	15	where
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	16	emptyI [simp, intro!]: "finite {}"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	17	\| insertI [simp, intro!]: "finite A \<Longrightarrow> finite (insert a A)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	18
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	19	lemma finite_induct [case_names empty insert, induct set: finite]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	20	-- {* Discharging @{text "x \<notin> F"} entails extra work. *}
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	21	assumes "finite F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	22	assumes "P {}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	23	and insert: "\<And>x F. finite F \<Longrightarrow> x \<notin> F \<Longrightarrow> P F \<Longrightarrow> P (insert x F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	24	shows "P F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	25	using `finite F` proof induct
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	26	show "P {}" by fact
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	27	fix x F assume F: "finite F" and P: "P F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	28	show "P (insert x F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	29	proof cases
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	30	assume "x \<in> F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	31	hence "insert x F = F" by (rule insert_absorb)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	32	with P show ?thesis by (simp only:)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	33	next
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	34	assume "x \<notin> F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	35	from F this P show ?thesis by (rule insert)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	36	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	37	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	38
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	39
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	40	subsubsection {* Choice principles *}
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	41
13737 e564c3d2d174 added a few lemmas nipkow parents: 13735 diff changeset	42	lemma ex_new_if_finite: -- "does not depend on def of finite at all"
14661 9ead82084de8 tuned notation; wenzelm parents: 14565 diff changeset	43	assumes "\<not> finite (UNIV :: 'a set)" and "finite A"
9ead82084de8 tuned notation; wenzelm parents: 14565 diff changeset	44	shows "\<exists>a::'a. a \<notin> A"
9ead82084de8 tuned notation; wenzelm parents: 14565 diff changeset	45	proof -
28823 dcbef866c9e2 tuned unfold_locales invocation haftmann parents: 27981 diff changeset	46	from assms have "A \<noteq> UNIV" by blast
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	47	then show ?thesis by blast
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	48	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	49
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	50	text {* A finite choice principle. Does not need the SOME choice operator. *}
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	51
29923 24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	52	lemma finite_set_choice:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	53	"finite A \<Longrightarrow> \<forall>x\<in>A. \<exists>y. P x y \<Longrightarrow> \<exists>f. \<forall>x\<in>A. P x (f x)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	54	proof (induct rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	55	case empty then show ?case by simp
29923 24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	56	next
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	57	case (insert a A)
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	58	then obtain f b where f: "ALL x:A. P x (f x)" and ab: "P a b" by auto
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	59	show ?case (is "EX f. ?P f")
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	60	proof
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	61	show "?P(%x. if x = a then b else f x)" using f ab by auto
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	62	qed
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	63	qed
24f56736c56f added finite_set_choice nipkow parents: 29920 diff changeset	64
23878 bd651ecd4b8a simplified HOL bootstrap haftmann parents: 23736 diff changeset	65
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	66	subsubsection {* Finite sets are the images of initial segments of natural numbers *}
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	67
15510 9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	68	lemma finite_imp_nat_seg_image_inj_on:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	69	assumes "finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	70	shows "\<exists>(n::nat) f. A = f ` {i. i < n} \<and> inj_on f {i. i < n}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	71	using assms proof induct
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	72	case empty
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	73	show ?case
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	74	proof
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	75	show "\<exists>f. {} = f ` {i::nat. i < 0} \<and> inj_on f {i. i < 0}" by simp
15510 9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	76	qed
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	77	next
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	78	case (insert a A)
23389 aaca6a8e5414 tuned proofs: avoid implicit prems; wenzelm parents: 23277 diff changeset	79	have notinA: "a \<notin> A" by fact
15510 9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	80	from insert.hyps obtain n f
9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	81	where "A = f ` {i::nat. i < n}" "inj_on f {i. i < n}" by blast
9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	82	hence "insert a A = f(n:=a) ` {i. i < Suc n}"
9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	83	"inj_on (f(n:=a)) {i. i < Suc n}" using notinA
9de204d7b699 new foldSet proofs paulson parents: 15509 diff changeset	84	by (auto simp add: image_def Ball_def inj_on_def less_Suc_eq)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	85	thus ?case by blast
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	86	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	87
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	88	lemma nat_seg_image_imp_finite:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	89	"A = f ` {i::nat. i < n} \<Longrightarrow> finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	90	proof (induct n arbitrary: A)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	91	case 0 thus ?case by simp
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	92	next
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	93	case (Suc n)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	94	let ?B = "f ` {i. i < n}"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	95	have finB: "finite ?B" by(rule Suc.hyps[OF refl])
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	96	show ?case
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	97	proof cases
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	98	assume "\<exists>k<n. f n = f k"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	99	hence "A = ?B" using Suc.prems by(auto simp:less_Suc_eq)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	100	thus ?thesis using finB by simp
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	101	next
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	102	assume "\<not>(\<exists> k<n. f n = f k)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	103	hence "A = insert (f n) ?B" using Suc.prems by(auto simp:less_Suc_eq)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	104	thus ?thesis using finB by simp
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	105	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	106	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	107
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	108	lemma finite_conv_nat_seg_image:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	109	"finite A \<longleftrightarrow> (\<exists>(n::nat) f. A = f ` {i::nat. i < n})"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	110	by (blast intro: nat_seg_image_imp_finite dest: finite_imp_nat_seg_image_inj_on)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	111
32988 d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	112	lemma finite_imp_inj_to_nat_seg:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	113	assumes "finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	114	shows "\<exists>f n::nat. f ` A = {i. i < n} \<and> inj_on f A"
32988 d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	115	proof -
d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	116	from finite_imp_nat_seg_image_inj_on[OF `finite A`]
d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	117	obtain f and n::nat where bij: "bij_betw f {i. i<n} A"
d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	118	by (auto simp:bij_betw_def)
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32989 diff changeset	119	let ?f = "the_inv_into {i. i<n} f"
32988 d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	120	have "inj_on ?f A & ?f ` A = {i. i<n}"
33057 764547b68538 inv_onto -> inv_into nipkow parents: 32989 diff changeset	121	by (fold bij_betw_def) (rule bij_betw_the_inv_into[OF bij])
32988 d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	122	thus ?thesis by blast
d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	123	qed
d1d4d7a08a66 Inv -> inv_onto, inv abbr. inv_onto UNIV. nipkow parents: 32705 diff changeset	124
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	125	lemma finite_Collect_less_nat [iff]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	126	"finite {n::nat. n < k}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	127	by (fastsimp simp: finite_conv_nat_seg_image)
29920 b95f5b8b93dd more finiteness nipkow parents: 29918 diff changeset	128
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	129	lemma finite_Collect_le_nat [iff]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	130	"finite {n::nat. n \<le> k}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	131	by (simp add: le_eq_less_or_eq Collect_disj_eq)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	132
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	133
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	134	subsubsection {* Finiteness and common set operations *}
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	135
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	136	lemma rev_finite_subset:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	137	"finite B \<Longrightarrow> A \<subseteq> B \<Longrightarrow> finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	138	proof (induct arbitrary: A rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	139	case empty
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	140	then show ?case by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	141	next
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	142	case (insert x F A)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	143	have A: "A \<subseteq> insert x F" and r: "A - {x} \<subseteq> F \<Longrightarrow> finite (A - {x})" by fact+
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	144	show "finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	145	proof cases
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	146	assume x: "x \<in> A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	147	with A have "A - {x} \<subseteq> F" by (simp add: subset_insert_iff)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	148	with r have "finite (A - {x})" .
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	149	hence "finite (insert x (A - {x}))" ..
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	150	also have "insert x (A - {x}) = A" using x by (rule insert_Diff)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	151	finally show ?thesis .
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	152	next
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	153	show "A \<subseteq> F ==> ?thesis" by fact
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	154	assume "x \<notin> A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	155	with A show "A \<subseteq> F" by (simp add: subset_insert_iff)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	156	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	157	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	158
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	159	lemma finite_subset:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	160	"A \<subseteq> B \<Longrightarrow> finite B \<Longrightarrow> finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	161	by (rule rev_finite_subset)
29901 f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	162
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	163	lemma finite_UnI:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	164	assumes "finite F" and "finite G"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	165	shows "finite (F \<union> G)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	166	using assms by induct simp_all
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	167
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	168	lemma finite_Un [iff]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	169	"finite (F \<union> G) \<longleftrightarrow> finite F \<and> finite G"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	170	by (blast intro: finite_UnI finite_subset [of _ "F \<union> G"])
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	171
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	172	lemma finite_insert [simp]: "finite (insert a A) \<longleftrightarrow> finite A"
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	173	proof -
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	174	have "finite {a} \<and> finite A \<longleftrightarrow> finite A" by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	175	then have "finite ({a} \<union> A) \<longleftrightarrow> finite A" by (simp only: finite_Un)
23389 aaca6a8e5414 tuned proofs: avoid implicit prems; wenzelm parents: 23277 diff changeset	176	then show ?thesis by simp
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	177	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	178
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	179	lemma finite_Int [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	180	"finite F \<or> finite G \<Longrightarrow> finite (F \<inter> G)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	181	by (blast intro: finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	182
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	183	lemma finite_Collect_conjI [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	184	"finite {x. P x} \<or> finite {x. Q x} \<Longrightarrow> finite {x. P x \<and> Q x}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	185	by (simp add: Collect_conj_eq)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	186
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	187	lemma finite_Collect_disjI [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	188	"finite {x. P x \<or> Q x} \<longleftrightarrow> finite {x. P x} \<and> finite {x. Q x}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	189	by (simp add: Collect_disj_eq)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	190
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	191	lemma finite_Diff [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	192	"finite A \<Longrightarrow> finite (A - B)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	193	by (rule finite_subset, rule Diff_subset)
29901 f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	194
f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	195	lemma finite_Diff2 [simp]:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	196	assumes "finite B"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	197	shows "finite (A - B) \<longleftrightarrow> finite A"
29901 f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	198	proof -
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	199	have "finite A \<longleftrightarrow> finite((A - B) \<union> (A \<inter> B))" by (simp add: Un_Diff_Int)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	200	also have "\<dots> \<longleftrightarrow> finite (A - B)" using `finite B` by simp
29901 f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	201	finally show ?thesis ..
f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	202	qed
f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	203
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	204	lemma finite_Diff_insert [iff]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	205	"finite (A - insert a B) \<longleftrightarrow> finite (A - B)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	206	proof -
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	207	have "finite (A - B) \<longleftrightarrow> finite (A - B - {a})" by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	208	moreover have "A - insert a B = A - B - {a}" by auto
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	209	ultimately show ?thesis by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	210	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	211
29901 f4b3f8fbf599 finiteness lemmas nipkow parents: 29879 diff changeset	212	lemma finite_compl[simp]:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	213	"finite (A :: 'a set) \<Longrightarrow> finite (- A) \<longleftrightarrow> finite (UNIV :: 'a set)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	214	by (simp add: Compl_eq_Diff_UNIV)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	215
29916 f24137b42d9b more finiteness nipkow parents: 29903 diff changeset	216	lemma finite_Collect_not[simp]:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	217	"finite {x :: 'a. P x} \<Longrightarrow> finite {x. \<not> P x} \<longleftrightarrow> finite (UNIV :: 'a set)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	218	by (simp add: Collect_neg_eq)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	219
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	220	lemma finite_Union [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	221	"finite A \<Longrightarrow> (\<And>M. M \<in> A \<Longrightarrow> finite M) \<Longrightarrow> finite(\<Union>A)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	222	by (induct rule: finite_induct) simp_all
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	223
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	224	lemma finite_UN_I [intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	225	"finite A \<Longrightarrow> (\<And>a. a \<in> A \<Longrightarrow> finite (B a)) \<Longrightarrow> finite (\<Union>a\<in>A. B a)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	226	by (induct rule: finite_induct) simp_all
29903 2c0046b26f80 more finiteness changes nipkow parents: 29901 diff changeset	227
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	228	lemma finite_UN [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	229	"finite A \<Longrightarrow> finite (UNION A B) \<longleftrightarrow> (\<forall>x\<in>A. finite (B x))"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	230	by (blast intro: finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	231
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	232	lemma finite_Inter [intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	233	"\<exists>A\<in>M. finite A \<Longrightarrow> finite (\<Inter>M)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	234	by (blast intro: Inter_lower finite_subset)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	235
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	236	lemma finite_INT [intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	237	"\<exists>x\<in>I. finite (A x) \<Longrightarrow> finite (\<Inter>x\<in>I. A x)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	238	by (blast intro: INT_lower finite_subset)
13825 ef4c41e7956a new inverse image lemmas paulson parents: 13737 diff changeset	239
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	240	lemma finite_imageI [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	241	"finite F \<Longrightarrow> finite (h ` F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	242	by (induct rule: finite_induct) simp_all
13825 ef4c41e7956a new inverse image lemmas paulson parents: 13737 diff changeset	243
31768 159cd6b5e5d4 lemma finite_image_set by Jeremy Avigad haftmann parents: 31465 diff changeset	244	lemma finite_image_set [simp]:
159cd6b5e5d4 lemma finite_image_set by Jeremy Avigad haftmann parents: 31465 diff changeset	245	"finite {x. P x} \<Longrightarrow> finite { f x \| x. P x }"
159cd6b5e5d4 lemma finite_image_set by Jeremy Avigad haftmann parents: 31465 diff changeset	246	by (simp add: image_Collect [symmetric])
159cd6b5e5d4 lemma finite_image_set by Jeremy Avigad haftmann parents: 31465 diff changeset	247
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	248	lemma finite_imageD:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	249	"finite (f ` A) \<Longrightarrow> inj_on f A \<Longrightarrow> finite A"
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	250	proof -
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	251	have aux: "!!A. finite (A - {}) = finite A" by simp
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	252	fix B :: "'a set"
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	253	assume "finite B"
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	254	thus "!!A. f`A = B ==> inj_on f A ==> finite A"
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	255	apply induct
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	256	apply simp
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	257	apply (subgoal_tac "EX y:A. f y = x & F = f ` (A - {y})")
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	258	apply clarify
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	259	apply (simp (no_asm_use) add: inj_on_def)
14208 144f45277d5a misc tidying paulson parents: 13825 diff changeset	260	apply (blast dest!: aux [THEN iffD1], atomize)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	261	apply (erule_tac V = "ALL A. ?PP (A)" in thin_rl)
14208 144f45277d5a misc tidying paulson parents: 13825 diff changeset	262	apply (frule subsetD [OF equalityD2 insertI1], clarify)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	263	apply (rule_tac x = xa in bexI)
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	264	apply (simp_all add: inj_on_image_set_diff)
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	265	done
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	266	qed (rule refl)
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	267
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	268	lemma finite_surj:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	269	"finite A \<Longrightarrow> B \<subseteq> f ` A \<Longrightarrow> finite B"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	270	by (erule finite_subset) (rule finite_imageI)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	271
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	272	lemma finite_range_imageI:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	273	"finite (range g) \<Longrightarrow> finite (range (\<lambda>x. f (g x)))"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	274	by (drule finite_imageI) (simp add: range_composition)
13825 ef4c41e7956a new inverse image lemmas paulson parents: 13737 diff changeset	275
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	276	lemma finite_subset_image:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	277	assumes "finite B"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	278	shows "B \<subseteq> f ` A \<Longrightarrow> \<exists>C\<subseteq>A. finite C \<and> B = f ` C"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	279	using assms proof induct
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	280	case empty then show ?case by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	281	next
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	282	case insert then show ?case
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	283	by (clarsimp simp del: image_insert simp add: image_insert [symmetric])
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	284	blast
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	285	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	286
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	287	lemma finite_vimageI:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	288	"finite F \<Longrightarrow> inj h \<Longrightarrow> finite (h -` F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	289	apply (induct rule: finite_induct)
21575 89463ae2612d tuned proofs; wenzelm parents: 21409 diff changeset	290	apply simp_all
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14331 diff changeset	291	apply (subst vimage_insert)
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	292	apply (simp add: finite_subset [OF inj_vimage_singleton])
13825 ef4c41e7956a new inverse image lemmas paulson parents: 13737 diff changeset	293	done
ef4c41e7956a new inverse image lemmas paulson parents: 13737 diff changeset	294
34111 1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	295	lemma finite_vimageD:
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	296	assumes fin: "finite (h -` F)" and surj: "surj h"
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	297	shows "finite F"
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	298	proof -
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	299	have "finite (h ` (h -` F))" using fin by (rule finite_imageI)
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	300	also have "h ` (h -` F) = F" using surj by (rule surj_image_vimage_eq)
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	301	finally show "finite F" .
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	302	qed
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	303
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	304	lemma finite_vimage_iff: "bij h \<Longrightarrow> finite (h -` F) \<longleftrightarrow> finite F"
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	305	unfolding bij_def by (auto elim: finite_vimageD finite_vimageI)
1b015caba46c add lemmas rev_finite_subset, finite_vimageD, finite_vimage_iff huffman parents: 34007 diff changeset	306
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	307	lemma finite_Collect_bex [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	308	assumes "finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	309	shows "finite {x. \<exists>y\<in>A. Q x y} \<longleftrightarrow> (\<forall>y\<in>A. finite {x. Q x y})"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	310	proof -
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	311	have "{x. \<exists>y\<in>A. Q x y} = (\<Union>y\<in>A. {x. Q x y})" by auto
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	312	with assms show ?thesis by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	313	qed
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	314
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	315	lemma finite_Collect_bounded_ex [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	316	assumes "finite {y. P y}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	317	shows "finite {x. \<exists>y. P y \<and> Q x y} \<longleftrightarrow> (\<forall>y. P y \<longrightarrow> finite {x. Q x y})"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	318	proof -
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	319	have "{x. EX y. P y & Q x y} = (\<Union>y\<in>{y. P y}. {x. Q x y})" by auto
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	320	with assms show ?thesis by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	321	qed
29920 b95f5b8b93dd more finiteness nipkow parents: 29918 diff changeset	322
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	323	lemma finite_Plus:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	324	"finite A \<Longrightarrow> finite B \<Longrightarrow> finite (A <+> B)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	325	by (simp add: Plus_def)
17022 b257300c3a9c added Brian Hufmann's finite instances nipkow parents: 16775 diff changeset	326
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	327	lemma finite_PlusD:
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	328	fixes A :: "'a set" and B :: "'b set"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	329	assumes fin: "finite (A <+> B)"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	330	shows "finite A" "finite B"
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	331	proof -
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	332	have "Inl ` A \<subseteq> A <+> B" by auto
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	333	then have "finite (Inl ` A :: ('a + 'b) set)" using fin by (rule finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	334	then show "finite A" by (rule finite_imageD) (auto intro: inj_onI)
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	335	next
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	336	have "Inr ` B \<subseteq> A <+> B" by auto
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	337	then have "finite (Inr ` B :: ('a + 'b) set)" using fin by (rule finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	338	then show "finite B" by (rule finite_imageD) (auto intro: inj_onI)
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	339	qed
21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	340
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	341	lemma finite_Plus_iff [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	342	"finite (A <+> B) \<longleftrightarrow> finite A \<and> finite B"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	343	by (auto intro: finite_PlusD finite_Plus)
31080 21ffc770ebc0 lemmas by Andreas Lochbihler nipkow parents: 31017 diff changeset	344
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	345	lemma finite_Plus_UNIV_iff [simp]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	346	"finite (UNIV :: ('a + 'b) set) \<longleftrightarrow> finite (UNIV :: 'a set) \<and> finite (UNIV :: 'b set)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	347	by (subst UNIV_Plus_UNIV [symmetric]) (rule finite_Plus_iff)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	348
40786 0a54cfc9add3 gave more standard finite set rules simp and intro attribute nipkow parents: 40716 diff changeset	349	lemma finite_SigmaI [simp, intro]:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	350	"finite A \<Longrightarrow> (\<And>a. a\<in>A \<Longrightarrow> finite (B a)) ==> finite (SIGMA a:A. B a)"
40786 0a54cfc9add3 gave more standard finite set rules simp and intro attribute nipkow parents: 40716 diff changeset	351	by (unfold Sigma_def) blast
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	352
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	353	lemma finite_cartesian_product:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	354	"finite A \<Longrightarrow> finite B \<Longrightarrow> finite (A \<times> B)"
15402 97204f3b4705 REorganized Finite_Set nipkow parents: 15392 diff changeset	355	by (rule finite_SigmaI)
97204f3b4705 REorganized Finite_Set nipkow parents: 15392 diff changeset	356
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	357	lemma finite_Prod_UNIV:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	358	"finite (UNIV :: 'a set) \<Longrightarrow> finite (UNIV :: 'b set) \<Longrightarrow> finite (UNIV :: ('a \<times> 'b) set)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	359	by (simp only: UNIV_Times_UNIV [symmetric] finite_cartesian_product)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	360
15409 a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	361	lemma finite_cartesian_productD1:
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	362	"finite (A \<times> B) \<Longrightarrow> B \<noteq> {} \<Longrightarrow> finite A"
15409 a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	363	apply (auto simp add: finite_conv_nat_seg_image)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	364	apply (drule_tac x=n in spec)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	365	apply (drule_tac x="fst o f" in spec)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	366	apply (auto simp add: o_def)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	367	prefer 2 apply (force dest!: equalityD2)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	368	apply (drule equalityD1)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	369	apply (rename_tac y x)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	370	apply (subgoal_tac "\<exists>k. k<n & f k = (x,y)")
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	371	prefer 2 apply force
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	372	apply clarify
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	373	apply (rule_tac x=k in image_eqI, auto)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	374	done
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	375
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	376	lemma finite_cartesian_productD2:
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	377	"[\| finite (A <*> B); A \<noteq> {} \|] ==> finite B"
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	378	apply (auto simp add: finite_conv_nat_seg_image)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	379	apply (drule_tac x=n in spec)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	380	apply (drule_tac x="snd o f" in spec)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	381	apply (auto simp add: o_def)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	382	prefer 2 apply (force dest!: equalityD2)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	383	apply (drule equalityD1)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	384	apply (rename_tac x y)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	385	apply (subgoal_tac "\<exists>k. k<n & f k = (x,y)")
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	386	prefer 2 apply force
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	387	apply clarify
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	388	apply (rule_tac x=k in image_eqI, auto)
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	389	done
a063687d24eb new and stronger lemmas and improved simplification for finite sets paulson parents: 15402 diff changeset	390
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	391	lemma finite_Pow_iff [iff]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	392	"finite (Pow A) \<longleftrightarrow> finite A"
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	393	proof
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	394	assume "finite (Pow A)"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	395	then have "finite ((%x. {x}) ` A)" by (blast intro: finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	396	then show "finite A" by (rule finite_imageD [unfolded inj_on_def]) simp
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	397	next
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	398	assume "finite A"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	399	then show "finite (Pow A)"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	400	by induct (simp_all add: Pow_insert)
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	401	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	402
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	403	corollary finite_Collect_subsets [simp, intro]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	404	"finite A \<Longrightarrow> finite {B. B \<subseteq> A}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	405	by (simp add: Pow_def [symmetric])
29918 214755b03df3 more finiteness nipkow parents: 29916 diff changeset	406
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	407	lemma finite_UnionD: "finite(\<Union>A) \<Longrightarrow> finite A"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	408	by (blast intro: finite_subset [OF subset_Pow_Union])
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	409
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	410
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	411	subsubsection {* Further induction rules on finite sets *}
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	412
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	413	lemma finite_ne_induct [case_names singleton insert, consumes 2]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	414	assumes "finite F" and "F \<noteq> {}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	415	assumes "\<And>x. P {x}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	416	and "\<And>x F. finite F \<Longrightarrow> F \<noteq> {} \<Longrightarrow> x \<notin> F \<Longrightarrow> P F \<Longrightarrow> P (insert x F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	417	shows "P F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	418	using assms proof induct
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	419	case empty then show ?case by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	420	next
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	421	case (insert x F) then show ?case by cases auto
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	422	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	423
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	424	lemma finite_subset_induct [consumes 2, case_names empty insert]:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	425	assumes "finite F" and "F \<subseteq> A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	426	assumes empty: "P {}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	427	and insert: "\<And>a F. finite F \<Longrightarrow> a \<in> A \<Longrightarrow> a \<notin> F \<Longrightarrow> P F \<Longrightarrow> P (insert a F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	428	shows "P F"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	429	using `finite F` `F \<subseteq> A` proof induct
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	430	show "P {}" by fact
31441 428e4caf2299 finite lemmas nipkow parents: 31438 diff changeset	431	next
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	432	fix x F
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	433	assume "finite F" and "x \<notin> F" and
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	434	P: "F \<subseteq> A \<Longrightarrow> P F" and i: "insert x F \<subseteq> A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	435	show "P (insert x F)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	436	proof (rule insert)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	437	from i show "x \<in> A" by blast
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	438	from i have "F \<subseteq> A" by blast
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	439	with P show "P F" .
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	440	show "finite F" by fact
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	441	show "x \<notin> F" by fact
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	442	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	443	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	444
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	445	lemma finite_empty_induct:
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	446	assumes "finite A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	447	assumes "P A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	448	and remove: "\<And>a A. finite A \<Longrightarrow> a \<in> A \<Longrightarrow> P A \<Longrightarrow> P (A - {a})"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	449	shows "P {}"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	450	proof -
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	451	have "\<And>B. B \<subseteq> A \<Longrightarrow> P (A - B)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	452	proof -
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	453	fix B :: "'a set"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	454	assume "B \<subseteq> A"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	455	with `finite A` have "finite B" by (rule rev_finite_subset)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	456	from this `B \<subseteq> A` show "P (A - B)"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	457	proof induct
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	458	case empty
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	459	from `P A` show ?case by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	460	next
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	461	case (insert b B)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	462	have "P (A - B - {b})"
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	463	proof (rule remove)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	464	from `finite A` show "finite (A - B)" by induct auto
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	465	from insert show "b \<in> A - B" by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	466	from insert show "P (A - B)" by simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	467	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	468	also have "A - B - {b} = A - insert b B" by (rule Diff_insert [symmetric])
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	469	finally show ?case .
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	470	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	471	qed
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	472	then have "P (A - A)" by blast
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	473	then show ?thesis by simp
31441 428e4caf2299 finite lemmas nipkow parents: 31438 diff changeset	474	qed
428e4caf2299 finite lemmas nipkow parents: 31438 diff changeset	475
428e4caf2299 finite lemmas nipkow parents: 31438 diff changeset	476
26441 7914697ff104 no "attach UNIV" any more haftmann parents: 26146 diff changeset	477	subsection {* Class @{text finite} *}
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	478
29797 08ef36ed2f8a handling type classes without parameters haftmann parents: 29675 diff changeset	479	class finite =
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	480	assumes finite_UNIV: "finite (UNIV \<Colon> 'a set)"
27430 1e25ac05cd87 prove lemma finite in context of finite class huffman parents: 27418 diff changeset	481	begin
1e25ac05cd87 prove lemma finite in context of finite class huffman parents: 27418 diff changeset	482
1e25ac05cd87 prove lemma finite in context of finite class huffman parents: 27418 diff changeset	483	lemma finite [simp]: "finite (A \<Colon> 'a set)"
26441 7914697ff104 no "attach UNIV" any more haftmann parents: 26146 diff changeset	484	by (rule subset_UNIV finite_UNIV finite_subset)+
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	485
40922 4d0f96a54e76 adding code equation for finiteness of finite types bulwahn parents: 40786 diff changeset	486	lemma finite_code [code]: "finite (A \<Colon> 'a set) = True"
4d0f96a54e76 adding code equation for finiteness of finite types bulwahn parents: 40786 diff changeset	487	by simp
4d0f96a54e76 adding code equation for finiteness of finite types bulwahn parents: 40786 diff changeset	488
27430 1e25ac05cd87 prove lemma finite in context of finite class huffman parents: 27418 diff changeset	489	end
1e25ac05cd87 prove lemma finite in context of finite class huffman parents: 27418 diff changeset	490
35828 46cfc4b8112e now use "Named_Thms" for "noatp", and renamed "noatp" to "no_atp" blanchet parents: 35796 diff changeset	491	lemma UNIV_unit [no_atp]:
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	492	"UNIV = {()}" by auto
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	493
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	494	instance unit :: finite proof
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	495	qed (simp add: UNIV_unit)
26146 61cb176d0385 tuned proofs haftmann parents: 26041 diff changeset	496
35828 46cfc4b8112e now use "Named_Thms" for "noatp", and renamed "noatp" to "no_atp" blanchet parents: 35796 diff changeset	497	lemma UNIV_bool [no_atp]:
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	498	"UNIV = {False, True}" by auto
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	499
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	500	instance bool :: finite proof
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	501	qed (simp add: UNIV_bool)
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	502
37678 0040bafffdef "prod" and "sum" replace "" and "+" respectively haftmann* parents: 37466 diff changeset	503	instance prod :: (finite, finite) finite proof
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	504	qed (simp only: UNIV_Times_UNIV [symmetric] finite_cartesian_product finite)
26146 61cb176d0385 tuned proofs haftmann parents: 26041 diff changeset	505
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	506	lemma finite_option_UNIV [simp]:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	507	"finite (UNIV :: 'a option set) = finite (UNIV :: 'a set)"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	508	by (auto simp add: UNIV_option_conv elim: finite_imageD intro: inj_Some)
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	509
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	510	instance option :: (finite) finite proof
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	511	qed (simp add: UNIV_option_conv)
26146 61cb176d0385 tuned proofs haftmann parents: 26041 diff changeset	512
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	513	lemma inj_graph: "inj (%f. {(x, y). y = f 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	514	by (rule inj_onI, auto simp add: set_eq_iff fun_eq_iff)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	515
26146 61cb176d0385 tuned proofs haftmann parents: 26041 diff changeset	516	instance "fun" :: (finite, finite) finite
61cb176d0385 tuned proofs haftmann parents: 26041 diff changeset	517	proof
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	518	show "finite (UNIV :: ('a => 'b) set)"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	519	proof (rule finite_imageD)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	520	let ?graph = "%f::'a => 'b. {(x, y). y = f x}"
26792 f2d75fd23124 - Deleted code setup for finite and card berghofe parents: 26757 diff changeset	521	have "range ?graph \<subseteq> Pow UNIV" by simp
f2d75fd23124 - Deleted code setup for finite and card berghofe parents: 26757 diff changeset	522	moreover have "finite (Pow (UNIV :: ('a * 'b) set))"
f2d75fd23124 - Deleted code setup for finite and card berghofe parents: 26757 diff changeset	523	by (simp only: finite_Pow_iff finite)
f2d75fd23124 - Deleted code setup for finite and card berghofe parents: 26757 diff changeset	524	ultimately show "finite (range ?graph)"
f2d75fd23124 - Deleted code setup for finite and card berghofe parents: 26757 diff changeset	525	by (rule finite_subset)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	526	show "inj ?graph" by (rule inj_graph)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	527	qed
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	528	qed
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	529
37678 0040bafffdef "prod" and "sum" replace "" and "+" respectively haftmann* parents: 37466 diff changeset	530	instance sum :: (finite, finite) finite proof
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	531	qed (simp only: UNIV_Plus_UNIV [symmetric] finite_Plus finite)
27981 feb0c01cf0fb tuned import order haftmann parents: 27611 diff changeset	532
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	533
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	534	subsection {* A basic fold functional for finite sets *}
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	535
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	536	text {* The intended behaviour is
31916 f3227bb306a4 recovered subscripts, which were lost in b41d61c768e2 (due to Emacs accident?); wenzelm parents: 31907 diff changeset	537	@{text "fold f z {x\<^isub>1, ..., x\<^isub>n} = f x\<^isub>1 (\<dots> (f x\<^isub>n z)\<dots>)"}
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	538	if @{text f} is ``left-commutative'':
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	539	*}
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	540
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	541	locale fun_left_comm =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	542	fixes f :: "'a \<Rightarrow> 'b \<Rightarrow> 'b"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	543	assumes fun_left_comm: "f x (f y z) = f y (f x z)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	544	begin
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	545
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	546	text{* On a functional level it looks much nicer: *}
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	547
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	548	lemma fun_comp_comm: "f x \<circ> f y = f y \<circ> f 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	549	by (simp add: fun_left_comm fun_eq_iff)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	550
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	551	end
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	552
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	553	inductive fold_graph :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'b \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> bool"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	554	for f :: "'a \<Rightarrow> 'b \<Rightarrow> 'b" and z :: 'b where
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	555	emptyI [intro]: "fold_graph f z {} z" \|
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	556	insertI [intro]: "x \<notin> A \<Longrightarrow> fold_graph f z A y
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	557	\<Longrightarrow> fold_graph f z (insert x A) (f x y)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	558
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	559	inductive_cases empty_fold_graphE [elim!]: "fold_graph f z {} x"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	560
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	561	definition fold :: "('a \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> 'b \<Rightarrow> 'a set \<Rightarrow> 'b" where
37767 a2b7a20d6ea3 dropped superfluous [code del]s haftmann parents: 37678 diff changeset	562	"fold f z A = (THE y. fold_graph f z A y)"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	563
15498 3988e90613d4 comment paulson parents: 15497 diff changeset	564	text{*A tempting alternative for the definiens is
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	565	@{term "if finite A then THE y. fold_graph f z A y else e"}.
15498 3988e90613d4 comment paulson parents: 15497 diff changeset	566	It allows the removal of finiteness assumptions from the theorems
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	567	@{text fold_comm}, @{text fold_reindex} and @{text fold_distrib}.
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	568	The proofs become ugly. It is not worth the effort. (???) *}
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	569
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	570
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	571	lemma Diff1_fold_graph:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	572	"fold_graph f z (A - {x}) y \<Longrightarrow> x \<in> A \<Longrightarrow> fold_graph f z A (f x y)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	573	by (erule insert_Diff [THEN subst], rule fold_graph.intros, auto)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	574
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	575	lemma fold_graph_imp_finite: "fold_graph f z A x \<Longrightarrow> finite A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	576	by (induct set: fold_graph) auto
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	577
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	578	lemma finite_imp_fold_graph: "finite A \<Longrightarrow> \<exists>x. fold_graph f z A x"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	579	by (induct rule: finite_induct) auto
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	580
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	581
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	582	subsubsection{From @{const fold_graph} to @{term fold}}
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	583
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	584	context fun_left_comm
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	585	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	586
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	587	lemma fold_graph_insertE_aux:
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	588	"fold_graph f z A y \<Longrightarrow> a \<in> A \<Longrightarrow> \<exists>y'. y = f a y' \<and> fold_graph f z (A - {a}) y'"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	589	proof (induct set: fold_graph)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	590	case (insertI x A y) show ?case
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	591	proof (cases "x = a")
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	592	assume "x = a" with insertI show ?case by auto
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	593	next
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	594	assume "x \<noteq> a"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	595	then obtain y' where y: "y = f a y'" and y': "fold_graph f z (A - {a}) y'"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	596	using insertI by auto
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	597	have 1: "f x y = f a (f x y')"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	598	unfolding y by (rule fun_left_comm)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	599	have 2: "fold_graph f z (insert x A - {a}) (f x y')"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	600	using y' and `x \<noteq> a` and `x \<notin> A`
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	601	by (simp add: insert_Diff_if fold_graph.insertI)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	602	from 1 2 show ?case by fast
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	603	qed
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	604	qed simp
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	605
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	606	lemma fold_graph_insertE:
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	607	assumes "fold_graph f z (insert x A) v" and "x \<notin> A"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	608	obtains y where "v = f x y" and "fold_graph f z A y"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	609	using assms by (auto dest: fold_graph_insertE_aux [OF _ insertI1])
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	610
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	611	lemma fold_graph_determ:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	612	"fold_graph f z A x \<Longrightarrow> fold_graph f z A y \<Longrightarrow> y = x"
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	613	proof (induct arbitrary: y set: fold_graph)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	614	case (insertI x A y v)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	615	from `fold_graph f z (insert x A) v` and `x \<notin> A`
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	616	obtain y' where "v = f x y'" and "fold_graph f z A y'"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	617	by (rule fold_graph_insertE)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	618	from `fold_graph f z A y'` have "y' = y" by (rule insertI)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	619	with `v = f x y'` show "v = f x y" by simp
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	620	qed fast
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	621
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	622	lemma fold_equality:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	623	"fold_graph f z A y \<Longrightarrow> fold f z A = y"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	624	by (unfold fold_def) (blast intro: fold_graph_determ)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	625
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	626	lemma fold_graph_fold: "finite A \<Longrightarrow> fold_graph f z A (fold f z A)"
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	627	unfolding fold_def
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	628	apply (rule theI')
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	629	apply (rule ex_ex1I)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	630	apply (erule finite_imp_fold_graph)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	631	apply (erule (1) fold_graph_determ)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	632	done
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	633
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	634	text{* The base case for @{text fold}: *}
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	635
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	636	lemma (in -) fold_empty [simp]: "fold f z {} = z"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	637	by (unfold fold_def) blast
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	638
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	639	text{* The various recursion equations for @{const fold}: *}
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	640
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	641	lemma fold_insert [simp]:
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	642	"finite A ==> x \<notin> A ==> fold f z (insert x A) = f x (fold f z A)"
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	643	apply (rule fold_equality)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	644	apply (erule fold_graph.insertI)
b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	645	apply (erule fold_graph_fold)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	646	done
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	647
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	648	lemma fold_fun_comm:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	649	"finite A \<Longrightarrow> f x (fold f z A) = fold f (f x z) A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	650	proof (induct rule: finite_induct)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	651	case empty then show ?case by simp
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	652	next
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	653	case (insert y A) then show ?case
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	654	by (simp add: fun_left_comm[of x])
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	655	qed
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	656
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	657	lemma fold_insert2:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	658	"finite A \<Longrightarrow> x \<notin> A \<Longrightarrow> fold f z (insert x A) = fold f (f x z) A"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	659	by (simp add: fold_fun_comm)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	660
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	661	lemma fold_rec:
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	662	assumes "finite A" and "x \<in> A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	663	shows "fold f z A = f x (fold f z (A - {x}))"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	664	proof -
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	665	have A: "A = insert x (A - {x})" using `x \<in> A` by blast
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	666	then have "fold f z A = fold f z (insert x (A - {x}))" by simp
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	667	also have "\<dots> = f x (fold f z (A - {x}))"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	668	by (rule fold_insert) (simp add: `finite A`)+
15535 a0cf3a19ee36 tuning nipkow parents: 15532 diff changeset	669	finally show ?thesis .
a0cf3a19ee36 tuning nipkow parents: 15532 diff changeset	670	qed
a0cf3a19ee36 tuning nipkow parents: 15532 diff changeset	671
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	672	lemma fold_insert_remove:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	673	assumes "finite A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	674	shows "fold f z (insert x A) = f x (fold f z (A - {x}))"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	675	proof -
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	676	from `finite A` have "finite (insert x A)" by auto
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	677	moreover have "x \<in> insert x A" by auto
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	678	ultimately have "fold f z (insert x A) = f x (fold f z (insert x A - {x}))"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	679	by (rule fold_rec)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	680	then show ?thesis by simp
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	681	qed
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	682
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	683	end
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	684
15480 cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	685	text{* A simplified version for idempotent functions: *}
cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	686
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	687	locale fun_left_comm_idem = fun_left_comm +
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	688	assumes fun_left_idem: "f x (f x z) = f x z"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	689	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	690
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	691	text{* The nice version: *}
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	692	lemma fun_comp_idem : "f x o f x = f 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	693	by (simp add: fun_left_idem fun_eq_iff)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	694
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	695	lemma fold_insert_idem:
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	696	assumes fin: "finite A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	697	shows "fold f z (insert x A) = f x (fold f z A)"
15480 cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	698	proof cases
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	699	assume "x \<in> A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	700	then obtain B where "A = insert x B" and "x \<notin> B" by (rule set_insert)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	701	then show ?thesis using assms by (simp add:fun_left_idem)
15480 cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	702	next
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	703	assume "x \<notin> A" then show ?thesis using assms by simp
15480 cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	704	qed
cb3612cc41a3 renamed a few vars, added a lemma nipkow parents: 15479 diff changeset	705
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	706	declare fold_insert[simp del] fold_insert_idem[simp]
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	707
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	708	lemma fold_insert_idem2:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	709	"finite A \<Longrightarrow> fold f z (insert x A) = fold f (f x z) A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	710	by(simp add:fold_fun_comm)
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	711
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	712	end
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	713
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	714
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	715	subsubsection {* Expressing set operations via @{const fold} *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	716
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	717	lemma (in fun_left_comm) fun_left_comm_apply:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	718	"fun_left_comm (\<lambda>x. f (g x))"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	719	proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	720	qed (simp_all add: fun_left_comm)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	721
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	722	lemma (in fun_left_comm_idem) fun_left_comm_idem_apply:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	723	"fun_left_comm_idem (\<lambda>x. f (g x))"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	724	by (rule fun_left_comm_idem.intro, rule fun_left_comm_apply, unfold_locales)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	725	(simp_all add: fun_left_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	726
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	727	lemma fun_left_comm_idem_insert:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	728	"fun_left_comm_idem insert"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	729	proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	730	qed auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	731
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	732	lemma fun_left_comm_idem_remove:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	733	"fun_left_comm_idem (\<lambda>x A. A - {x})"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	734	proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	735	qed auto
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	736
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	737	lemma (in semilattice_inf) fun_left_comm_idem_inf:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	738	"fun_left_comm_idem inf"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	739	proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	740	qed (auto simp add: inf_left_commute)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	741
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	742	lemma (in semilattice_sup) fun_left_comm_idem_sup:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	743	"fun_left_comm_idem sup"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	744	proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	745	qed (auto simp add: sup_left_commute)
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	746
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	747	lemma union_fold_insert:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	748	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	749	shows "A \<union> B = fold insert B A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	750	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	751	interpret fun_left_comm_idem insert by (fact fun_left_comm_idem_insert)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	752	from `finite A` show ?thesis by (induct A arbitrary: B) simp_all
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	753	qed
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	754
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	755	lemma minus_fold_remove:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	756	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	757	shows "B - A = fold (\<lambda>x A. A - {x}) B A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	758	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	759	interpret fun_left_comm_idem "\<lambda>x A. A - {x}" by (fact fun_left_comm_idem_remove)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	760	from `finite A` show ?thesis by (induct A arbitrary: B) auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	761	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	762
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	763	context complete_lattice
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	764	begin
f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	765
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	766	lemma inf_Inf_fold_inf:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	767	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	768	shows "inf B (Inf A) = fold inf B A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	769	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	770	interpret fun_left_comm_idem inf by (fact fun_left_comm_idem_inf)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	771	from `finite A` show ?thesis by (induct A arbitrary: B)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	772	(simp_all add: Inf_insert inf_commute fold_fun_comm)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	773	qed
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	774
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	775	lemma sup_Sup_fold_sup:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	776	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	777	shows "sup B (Sup A) = fold sup B A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	778	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	779	interpret fun_left_comm_idem sup by (fact fun_left_comm_idem_sup)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	780	from `finite A` show ?thesis by (induct A arbitrary: B)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	781	(simp_all add: Sup_insert sup_commute fold_fun_comm)
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	782	qed
f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	783
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	784	lemma Inf_fold_inf:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	785	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	786	shows "Inf A = fold inf top A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	787	using assms inf_Inf_fold_inf [of A top] by (simp add: inf_absorb2)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	788
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	789	lemma Sup_fold_sup:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	790	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	791	shows "Sup A = fold sup bot A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	792	using assms sup_Sup_fold_sup [of A bot] by (simp add: sup_absorb2)
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	793
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	794	lemma inf_INFI_fold_inf:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	795	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	796	shows "inf B (INFI A f) = fold (\<lambda>A. inf (f A)) B A" (is "?inf = ?fold")
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	797	proof (rule sym)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	798	interpret fun_left_comm_idem inf by (fact fun_left_comm_idem_inf)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	799	interpret fun_left_comm_idem "\<lambda>A. inf (f A)" by (fact fun_left_comm_idem_apply)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	800	from `finite A` show "?fold = ?inf"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	801	by (induct A arbitrary: B)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	802	(simp_all add: INFI_def Inf_insert inf_left_commute)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	803	qed
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	804
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	805	lemma sup_SUPR_fold_sup:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	806	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	807	shows "sup B (SUPR A f) = fold (\<lambda>A. sup (f A)) B A" (is "?sup = ?fold")
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	808	proof (rule sym)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	809	interpret fun_left_comm_idem sup by (fact fun_left_comm_idem_sup)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	810	interpret fun_left_comm_idem "\<lambda>A. sup (f A)" by (fact fun_left_comm_idem_apply)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	811	from `finite A` show "?fold = ?sup"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	812	by (induct A arbitrary: B)
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	813	(simp_all add: SUPR_def Sup_insert sup_left_commute)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	814	qed
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	815
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	816	lemma INFI_fold_inf:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	817	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	818	shows "INFI A f = fold (\<lambda>A. inf (f A)) top A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	819	using assms inf_INFI_fold_inf [of A top] by simp
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	820
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	821	lemma SUPR_fold_sup:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	822	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	823	shows "SUPR A f = fold (\<lambda>A. sup (f A)) bot A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	824	using assms sup_SUPR_fold_sup [of A bot] by simp
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	825
f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	826	end
f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	827
f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	828
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	829	subsection {* The derived combinator @{text fold_image} *}
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	830
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	831	definition fold_image :: "('b \<Rightarrow> 'b \<Rightarrow> 'b) \<Rightarrow> ('a \<Rightarrow> 'b) \<Rightarrow> 'b \<Rightarrow> 'a set \<Rightarrow> 'b"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	832	where "fold_image f g = fold (%x y. f (g x) y)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	833
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	834	lemma fold_image_empty[simp]: "fold_image f g z {} = z"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	835	by(simp add:fold_image_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	836
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	837	context ab_semigroup_mult
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	838	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	839
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	840	lemma fold_image_insert[simp]:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	841	assumes "finite A" and "a \<notin> A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	842	shows "fold_image times g z (insert a A) = g a * (fold_image times g z A)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	843	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	844	interpret I: fun_left_comm "%x y. (g x) * y"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	845	by unfold_locales (simp add: mult_ac)
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	846	show ?thesis using assms by(simp add:fold_image_def)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	847	qed
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	848
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	849	(*
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	850	lemma fold_commute:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	851	"finite A ==> (!!z. x * (fold times g z A) = fold times g (x * z) A)"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	852	apply (induct set: finite)
21575 89463ae2612d tuned proofs; wenzelm parents: 21409 diff changeset	853	apply simp
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	854	apply (simp add: mult_left_commute [of x])
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	855	done
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	856
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	857	lemma fold_nest_Un_Int:
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	858	"finite A ==> finite B
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	859	==> fold times g (fold times g z B) A = fold times g (fold times g z (A Int B)) (A Un B)"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	860	apply (induct set: finite)
21575 89463ae2612d tuned proofs; wenzelm parents: 21409 diff changeset	861	apply simp
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	862	apply (simp add: fold_commute Int_insert_left insert_absorb)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	863	done
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	864
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	865	lemma fold_nest_Un_disjoint:
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	866	"finite A ==> finite B ==> A Int B = {}
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	867	==> fold times g z (A Un B) = fold times g (fold times g z B) A"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	868	by (simp add: fold_nest_Un_Int)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	869	*)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	870
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	871	lemma fold_image_reindex:
15487 55497029b255 generalization and tidying paulson parents: 15484 diff changeset	872	assumes fin: "finite A"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	873	shows "inj_on h A \<Longrightarrow> fold_image times g z (h`A) = fold_image times (g\<circ>h) z A"
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31916 diff changeset	874	using fin by induct auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	875
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	876	(*
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	877	text{*
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	878	Fusion theorem, as described in Graham Hutton's paper,
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	879	A Tutorial on the Universality and Expressiveness of Fold,
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	880	JFP 9:4 (355-372), 1999.
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	881	*}
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	882
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	883	lemma fold_fusion:
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 27430 diff changeset	884	assumes "ab_semigroup_mult g"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	885	assumes fin: "finite A"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	886	and hyp: "\<And>x y. h (g x y) = times x (h y)"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	887	shows "h (fold g j w A) = fold times j (h w) A"
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 27430 diff changeset	888	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	889	class_interpret ab_semigroup_mult [g] by fact
27611 2c01c0bdb385 Removed uses of context element includes. ballarin parents: 27430 diff changeset	890	show ?thesis using fin hyp by (induct set: finite) simp_all
2c01c0bdb385 Removed uses of context element includes. ballarin parents: 27430 diff changeset	891	qed
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	892	*)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	893
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	894	lemma fold_image_cong:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	895	"finite A \<Longrightarrow>
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	896	(!!x. x:A ==> g x = h x) ==> fold_image times g z A = fold_image times h z A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	897	apply (subgoal_tac "ALL C. C <= A --> (ALL x:C. g x = h x) --> fold_image times g z C = fold_image times h z C")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	898	apply simp
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	899	apply (erule finite_induct, simp)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	900	apply (simp add: subset_insert_iff, clarify)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	901	apply (subgoal_tac "finite C")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	902	prefer 2 apply (blast dest: finite_subset [COMP swap_prems_rl])
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	903	apply (subgoal_tac "C = insert x (C - {x})")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	904	prefer 2 apply blast
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	905	apply (erule ssubst)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	906	apply (drule spec)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	907	apply (erule (1) notE impE)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	908	apply (simp add: Ball_def del: insert_Diff_single)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	909	done
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	910
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	911	end
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	912
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	913	context comm_monoid_mult
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	914	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	915
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	916	lemma fold_image_1:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	917	"finite S \<Longrightarrow> (\<forall>x\<in>S. f x = 1) \<Longrightarrow> fold_image op * f 1 S = 1"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	918	apply (induct rule: finite_induct)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	919	apply simp by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	920
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	921	lemma fold_image_Un_Int:
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	922	"finite A ==> finite B ==>
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	923	fold_image times g 1 A * fold_image times g 1 B =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	924	fold_image times g 1 (A Un B) * fold_image times g 1 (A Int B)"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	925	apply (induct rule: finite_induct)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	926	by (induct set: finite)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	927	(auto simp add: mult_ac insert_absorb Int_insert_left)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	928
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	929	lemma fold_image_Un_one:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	930	assumes fS: "finite S" and fT: "finite T"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	931	and I0: "\<forall>x \<in> S\<inter>T. f x = 1"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	932	shows "fold_image (op ) f 1 (S \<union> T) = fold_image (op ) f 1 S * fold_image (op *) f 1 T"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	933	proof-
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	934	have "fold_image op * f 1 (S \<inter> T) = 1"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	935	apply (rule fold_image_1)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	936	using fS fT I0 by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	937	with fold_image_Un_Int[OF fS fT] show ?thesis by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	938	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	939
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	940	corollary fold_Un_disjoint:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	941	"finite A ==> finite B ==> A Int B = {} ==>
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	942	fold_image times g 1 (A Un B) =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	943	fold_image times g 1 A * fold_image times g 1 B"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	944	by (simp add: fold_image_Un_Int)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	945
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	946	lemma fold_image_UN_disjoint:
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	947	"\<lbrakk> finite I; ALL i:I. finite (A i);
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	948	ALL i:I. ALL j:I. i \<noteq> j --> A i Int A j = {} \<rbrakk>
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	949	\<Longrightarrow> fold_image times g 1 (UNION I A) =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	950	fold_image times (%i. fold_image times g 1 (A i)) 1 I"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	951	apply (induct rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	952	apply simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	953	apply atomize
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	954	apply (subgoal_tac "ALL i:F. x \<noteq> i")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	955	prefer 2 apply blast
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	956	apply (subgoal_tac "A x Int UNION F A = {}")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	957	prefer 2 apply blast
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	958	apply (simp add: fold_Un_disjoint)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	959	done
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	960
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	961	lemma fold_image_Sigma: "finite A ==> ALL x:A. finite (B x) ==>
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	962	fold_image times (%x. fold_image times (g x) 1 (B x)) 1 A =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	963	fold_image times (split g) 1 (SIGMA x:A. B x)"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	964	apply (subst Sigma_def)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	965	apply (subst fold_image_UN_disjoint, assumption, simp)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	966	apply blast
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	967	apply (erule fold_image_cong)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	968	apply (subst fold_image_UN_disjoint, simp, simp)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	969	apply blast
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	970	apply simp
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	971	done
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	972
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	973	lemma fold_image_distrib: "finite A \<Longrightarrow>
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	974	fold_image times (%x. g x * h x) 1 A =
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	975	fold_image times g 1 A * fold_image times h 1 A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	976	by (erule finite_induct) (simp_all add: mult_ac)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	977
30260 be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	978	lemma fold_image_related:
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	979	assumes Re: "R e e"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	980	and Rop: "\<forall>x1 y1 x2 y2. R x1 x2 \<and> R y1 y2 \<longrightarrow> R (x1 * y1) (x2 * y2)"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	981	and fS: "finite S" and Rfg: "\<forall>x\<in>S. R (h x) (g x)"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	982	shows "R (fold_image (op ) h e S) (fold_image (op ) g e S)"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	983	using fS by (rule finite_subset_induct) (insert assms, auto)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	984
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	985	lemma fold_image_eq_general:
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	986	assumes fS: "finite S"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	987	and h: "\<forall>y\<in>S'. \<exists>!x. x\<in> S \<and> h(x) = y"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	988	and f12: "\<forall>x\<in>S. h x \<in> S' \<and> f2(h x) = f1 x"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	989	shows "fold_image (op ) f1 e S = fold_image (op ) f2 e S'"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	990	proof-
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	991	from h f12 have hS: "h ` S = S'" by auto
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	992	{fix x y assume H: "x \<in> S" "y \<in> S" "h x = h y"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	993	from f12 h H have "x = y" by auto }
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	994	hence hinj: "inj_on h S" unfolding inj_on_def Ex1_def by blast
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	995	from f12 have th: "\<And>x. x \<in> S \<Longrightarrow> (f2 \<circ> h) x = f1 x" by auto
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	996	from hS have "fold_image (op ) f2 e S' = fold_image (op ) f2 e (h ` S)" by simp
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	997	also have "\<dots> = fold_image (op *) (f2 o h) e S"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	998	using fold_image_reindex[OF fS hinj, of f2 e] .
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	999	also have "\<dots> = fold_image (op *) f1 e S " using th fold_image_cong[OF fS, of "f2 o h" f1 e]
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1000	by blast
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1001	finally show ?thesis ..
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1002	qed
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1003
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1004	lemma fold_image_eq_general_inverses:
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1005	assumes fS: "finite S"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1006	and kh: "\<And>y. y \<in> T \<Longrightarrow> k y \<in> S \<and> h (k y) = y"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1007	and hk: "\<And>x. x \<in> S \<Longrightarrow> h x \<in> T \<and> k (h x) = x \<and> g (h x) = f x"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1008	shows "fold_image (op ) f e S = fold_image (op ) g e T"
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1009	(* metis solves it, but not yet available here *)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1010	apply (rule fold_image_eq_general[OF fS, of T h g f e])
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1011	apply (rule ballI)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1012	apply (frule kh)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1013	apply (rule ex1I[])
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1014	apply blast
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1015	apply clarsimp
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1016	apply (drule hk) apply simp
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1017	apply (rule sym)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1018	apply (erule conjunct1[OF conjunct2[OF hk]])
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1019	apply (rule ballI)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1020	apply (drule hk)
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1021	apply blast
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1022	done
be39acd3ac85 Added general theorems for fold_image, setsum and set_prod chaieb parents: 29966 diff changeset	1023
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1024	end
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1025
25162 ad4d5365d9d8 went back to >0 nipkow parents: 25062 diff changeset	1026
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1027	subsection {* A fold functional for non-empty sets *}
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1028
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1029	text{* Does not require start value. *}
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1030
23736 bf8d4a46452d Renamed inductive2 to inductive. berghofe parents: 23706 diff changeset	1031	inductive
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1032	fold1Set :: "('a => 'a => 'a) => 'a set => 'a => bool"
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1033	for f :: "'a => 'a => 'a"
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1034	where
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1035	fold1Set_insertI [intro]:
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1036	"\<lbrakk> fold_graph f a A x; a \<notin> A \<rbrakk> \<Longrightarrow> fold1Set f (insert a A) x"
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1037
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35267 diff changeset	1038	definition fold1 :: "('a => 'a => 'a) => 'a set => 'a" where
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1039	"fold1 f A == THE x. fold1Set f A x"
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1040
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1041	lemma fold1Set_nonempty:
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1042	"fold1Set f A x \<Longrightarrow> A \<noteq> {}"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1043	by(erule fold1Set.cases, simp_all)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1044
23736 bf8d4a46452d Renamed inductive2 to inductive. berghofe parents: 23706 diff changeset	1045	inductive_cases empty_fold1SetE [elim!]: "fold1Set f {} x"
bf8d4a46452d Renamed inductive2 to inductive. berghofe parents: 23706 diff changeset	1046
bf8d4a46452d Renamed inductive2 to inductive. berghofe parents: 23706 diff changeset	1047	inductive_cases insert_fold1SetE [elim!]: "fold1Set f (insert a X) x"
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1048
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1049
96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1050	lemma fold1Set_sing [iff]: "(fold1Set f {a} b) = (a = b)"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1051	by (blast elim: fold_graph.cases)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1052
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1053	lemma fold1_singleton [simp]: "fold1 f {a} = a"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1054	by (unfold fold1_def) blast
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1055
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1056	lemma finite_nonempty_imp_fold1Set:
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1057	"\<lbrakk> finite A; A \<noteq> {} \<rbrakk> \<Longrightarrow> EX x. fold1Set f A x"
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1058	apply (induct A rule: finite_induct)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1059	apply (auto dest: finite_imp_fold_graph [of _ f])
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1060	done
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1061
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1062	text{First, some lemmas about @{const fold_graph}.}
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1063
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1064	context ab_semigroup_mult
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1065	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1066
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1067	lemma fun_left_comm: "fun_left_comm(op *)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1068	by unfold_locales (simp add: mult_ac)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1069
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1070	lemma fold_graph_insert_swap:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1071	assumes fold: "fold_graph times (b::'a) A y" and "b \<notin> A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1072	shows "fold_graph times z (insert b A) (z * y)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1073	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	1074	interpret fun_left_comm "op *::'a \<Rightarrow> 'a \<Rightarrow> 'a" by (rule fun_left_comm)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1075	from assms show ?thesis
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1076	proof (induct rule: fold_graph.induct)
36045 b846881928ea simplify fold_graph proofs huffman parents: 35831 diff changeset	1077	case emptyI show ?case by (subst mult_commute [of z b], fast)
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1078	next
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1079	case (insertI x A y)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1080	have "fold_graph times z (insert x (insert b A)) (x * (z * y))"
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1081	using insertI by force --{how does @{term id} get unfolded?}
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1082	thus ?case by (simp add: insert_commute mult_ac)
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1083	qed
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1084	qed
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1085
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1086	lemma fold_graph_permute_diff:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1087	assumes fold: "fold_graph times b A x"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1088	shows "!!a. \<lbrakk>a \<in> A; b \<notin> A\<rbrakk> \<Longrightarrow> fold_graph times a (insert b (A-{a})) x"
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1089	using fold
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1090	proof (induct rule: fold_graph.induct)
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1091	case emptyI thus ?case by simp
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1092	next
22262 96ba62dff413 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	1093	case (insertI x A y)
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1094	have "a = x \<or> a \<in> A" using insertI by simp
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1095	thus ?case
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1096	proof
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1097	assume "a = x"
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1098	with insertI show ?thesis
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1099	by (simp add: id_def [symmetric], blast intro: fold_graph_insert_swap)
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1100	next
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1101	assume ainA: "a \<in> A"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1102	hence "fold_graph times a (insert x (insert b (A - {a}))) (x * y)"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1103	using insertI by force
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1104	moreover
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1105	have "insert x (insert b (A - {a})) = insert b (insert x A - {a})"
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1106	using ainA insertI by blast
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1107	ultimately show ?thesis by simp
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1108	qed
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1109	qed
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1110
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1111	lemma fold1_eq_fold:
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1112	assumes "finite A" "a \<notin> A" shows "fold1 times (insert a A) = fold times a A"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1113	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	1114	interpret fun_left_comm "op *::'a \<Rightarrow> 'a \<Rightarrow> 'a" by (rule fun_left_comm)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1115	from assms show ?thesis
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1116	apply (simp add: fold1_def fold_def)
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1117	apply (rule the_equality)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1118	apply (best intro: fold_graph_determ theI dest: finite_imp_fold_graph [of _ times])
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1119	apply (rule sym, clarify)
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1120	apply (case_tac "Aa=A")
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1121	apply (best intro: fold_graph_determ)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1122	apply (subgoal_tac "fold_graph times a A x")
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1123	apply (best intro: fold_graph_determ)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1124	apply (subgoal_tac "insert aa (Aa - {a}) = A")
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1125	prefer 2 apply (blast elim: equalityE)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1126	apply (auto dest: fold_graph_permute_diff [where a=a])
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1127	done
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1128	qed
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1129
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1130	lemma nonempty_iff: "(A \<noteq> {}) = (\<exists>x B. A = insert x B & x \<notin> B)"
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1131	apply safe
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1132	apply simp
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1133	apply (drule_tac x=x in spec)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1134	apply (drule_tac x="A-{x}" in spec, auto)
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1135	done
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1136
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1137	lemma fold1_insert:
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1138	assumes nonempty: "A \<noteq> {}" and A: "finite A" "x \<notin> A"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1139	shows "fold1 times (insert x A) = x * fold1 times A"
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1140	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	1141	interpret fun_left_comm "op *::'a \<Rightarrow> 'a \<Rightarrow> 'a" by (rule fun_left_comm)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1142	from nonempty obtain a A' where "A = insert a A' & a ~: A'"
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1143	by (auto simp add: nonempty_iff)
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1144	with A show ?thesis
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1145	by (simp add: insert_commute [of x] fold1_eq_fold eq_commute)
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1146	qed
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1147
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1148	end
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1149
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1150	context ab_semigroup_idem_mult
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1151	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1152
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1153	lemma fun_left_comm_idem: "fun_left_comm_idem(op *)"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1154	apply unfold_locales
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1155	apply (rule mult_left_commute)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1156	apply (rule mult_left_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1157	done
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1158
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1159	lemma fold1_insert_idem [simp]:
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1160	assumes nonempty: "A \<noteq> {}" and A: "finite A"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1161	shows "fold1 times (insert x A) = x * fold1 times A"
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1162	proof -
29223 e09c53289830 Conversion of HOL-Main and ZF to new locales. ballarin parents: 29025 diff changeset	1163	interpret fun_left_comm_idem "op *::'a \<Rightarrow> 'a \<Rightarrow> 'a"
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1164	by (rule fun_left_comm_idem)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1165	from nonempty obtain a A' where A': "A = insert a A' & a ~: A'"
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1166	by (auto simp add: nonempty_iff)
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1167	show ?thesis
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1168	proof cases
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	1169	assume a: "a = x"
efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	1170	show ?thesis
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1171	proof cases
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1172	assume "A' = {}"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	1173	with A' a show ?thesis by simp
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1174	next
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1175	assume "A' \<noteq> {}"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	1176	with A A' a show ?thesis
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1177	by (simp add: fold1_insert mult_assoc [symmetric])
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1178	qed
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1179	next
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1180	assume "a \<noteq> x"
41550 efa734d9b221 eliminated global prems; wenzelm parents: 40945 diff changeset	1181	with A A' show ?thesis
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1182	by (simp add: insert_commute fold1_eq_fold)
15521 1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1183	qed
1ffd04343ac9 non-inductive fold1Set proofs paulson parents: 15520 diff changeset	1184	qed
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1185
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1186	lemma hom_fold1_commute:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1187	assumes hom: "!!x y. h (x * y) = h x * h y"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1188	and N: "finite N" "N \<noteq> {}" shows "h (fold1 times N) = fold1 times (h ` N)"
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1189	using N proof (induct rule: finite_ne_induct)
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1190	case singleton thus ?case by simp
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1191	next
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1192	case (insert n N)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1193	then have "h (fold1 times (insert n N)) = h (n * fold1 times N)" by simp
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1194	also have "\<dots> = h n * h (fold1 times N)" by(rule hom)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1195	also have "h (fold1 times N) = fold1 times (h ` N)" by(rule insert)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1196	also have "times (h n) \<dots> = fold1 times (insert (h n) (h ` N))"
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1197	using insert by(simp)
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1198	also have "insert (h n) (h ` N) = h ` insert n N" by simp
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1199	finally show ?case .
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1200	qed
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1201
32679 096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1202	lemma fold1_eq_fold_idem:
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1203	assumes "finite A"
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1204	shows "fold1 times (insert a A) = fold times a A"
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1205	proof (cases "a \<in> A")
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1206	case False
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1207	with assms show ?thesis by (simp add: fold1_eq_fold)
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1208	next
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1209	interpret fun_left_comm_idem times by (fact fun_left_comm_idem)
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1210	case True then obtain b B
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1211	where A: "A = insert a B" and "a \<notin> B" by (rule set_insert)
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1212	with assms have "finite B" by auto
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1213	then have "fold times a (insert a B) = fold times (a * a) B"
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1214	using `a \<notin> B` by (rule fold_insert2)
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1215	then show ?thesis
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1216	using `a \<notin> B` `finite B` by (simp add: fold1_eq_fold A)
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1217	qed
096306d7391d idempotency case for fold1 haftmann parents: 32642 diff changeset	1218
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1219	end
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1220
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1221
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1222	text{* Now the recursion rules for definitions: *}
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1223
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1224	lemma fold1_singleton_def: "g = fold1 f \<Longrightarrow> g {a} = a"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35171 diff changeset	1225	by simp
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1226
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1227	lemma (in ab_semigroup_mult) fold1_insert_def:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1228	"\<lbrakk> g = fold1 times; finite A; x \<notin> A; A \<noteq> {} \<rbrakk> \<Longrightarrow> g (insert x A) = x * g A"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1229	by (simp add:fold1_insert)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1230
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1231	lemma (in ab_semigroup_idem_mult) fold1_insert_idem_def:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1232	"\<lbrakk> g = fold1 times; finite A; A \<noteq> {} \<rbrakk> \<Longrightarrow> g (insert x A) = x * g A"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1233	by simp
15508 c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1234
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1235	subsubsection{* Determinacy for @{term fold1Set} *}
c09defa4c956 revised fold1 proofs paulson parents: 15507 diff changeset	1236
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1237	(Not actually used!!)
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1238	(*
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1239	context ab_semigroup_mult
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1240	begin
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1241
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1242	lemma fold_graph_permute:
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1243	"[\|fold_graph times id b (insert a A) x; a \<notin> A; b \<notin> A\|]
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1244	==> fold_graph times id a (insert b A) x"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1245	apply (cases "a=b")
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1246	apply (auto dest: fold_graph_permute_diff)
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1247	done
15376 302ef111b621 Started to clean up and generalize FiniteSet nipkow parents: 15327 diff changeset	1248
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1249	lemma fold1Set_determ:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1250	"fold1Set times A x ==> fold1Set times A y ==> y = x"
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1251	proof (clarify elim!: fold1Set.cases)
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1252	fix A x B y a b
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1253	assume Ax: "fold_graph times id a A x"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1254	assume By: "fold_graph times id b B y"
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1255	assume anotA: "a \<notin> A"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1256	assume bnotB: "b \<notin> B"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1257	assume eq: "insert a A = insert b B"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1258	show "y=x"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1259	proof cases
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1260	assume same: "a=b"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1261	hence "A=B" using anotA bnotB eq by (blast elim!: equalityE)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1262	thus ?thesis using Ax By same by (blast intro: fold_graph_determ)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1263	next
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1264	assume diff: "a\<noteq>b"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1265	let ?D = "B - {a}"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1266	have B: "B = insert a ?D" and A: "A = insert b ?D"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1267	and aB: "a \<in> B" and bA: "b \<in> A"
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1268	using eq anotA bnotB diff by (blast elim!:equalityE)+
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1269	with aB bnotB By
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1270	have "fold_graph times id a (insert b ?D) y"
69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1271	by (auto intro: fold_graph_permute simp add: insert_absorb)
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1272	moreover
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1273	have "fold_graph times id a (insert b ?D) x"
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1274	by (simp add: A [symmetric] Ax)
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1275	ultimately show ?thesis by (blast intro: fold_graph_determ)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 15376 diff changeset	1276	qed
12396 2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1277	qed
2298d5b8e530 renamed theory Finite to Finite_Set and converted; wenzelm parents: diff changeset	1278
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1279	lemma fold1Set_equality: "fold1Set times A y ==> fold1 times A = y"
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1280	by (unfold fold1_def) (blast intro: fold1Set_determ)
864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1281
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1282	end
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1283	*)
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1284
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1285	declare
28853 69eb69659bf3 Added new fold operator and renamed the old oe to fold_image. nipkow parents: 28823 diff changeset	1286	empty_fold_graphE [rule del] fold_graph.intros [rule del]
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1287	empty_fold1SetE [rule del] insert_fold1SetE [rule del]
19931 fb32b43e7f80 Restructured locales with predicates: import is now an interpretation. ballarin parents: 19870 diff changeset	1288	-- {* No more proofs involve these relations. *}
15376 302ef111b621 Started to clean up and generalize FiniteSet nipkow parents: 15327 diff changeset	1289
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1290	subsubsection {* Lemmas about @{text fold1} *}
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1291
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1292	context ab_semigroup_mult
22917 3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1293	begin
3c56b12fd946 localized Min/Max haftmann parents: 22616 diff changeset	1294
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1295	lemma fold1_Un:
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1296	assumes A: "finite A" "A \<noteq> {}"
2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1297	shows "finite B \<Longrightarrow> B \<noteq> {} \<Longrightarrow> A Int B = {} \<Longrightarrow>
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1298	fold1 times (A Un B) = fold1 times A * fold1 times B"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1299	using A by (induct rule: finite_ne_induct)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1300	(simp_all add: fold1_insert mult_assoc)
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1301
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1302	lemma fold1_in:
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1303	assumes A: "finite (A)" "A \<noteq> {}" and elem: "\<And>x y. x * y \<in> {x,y}"
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1304	shows "fold1 times A \<in> A"
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1305	using A
2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1306	proof (induct rule:finite_ne_induct)
15506 864238c95b56 new treatment of fold1 paulson parents: 15505 diff changeset	1307	case singleton thus ?case by simp
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1308	next
2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1309	case insert thus ?case using elem by (force simp add:fold1_insert)
2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1310	qed
2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1311
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1312	end
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1313
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1314	lemma (in ab_semigroup_idem_mult) fold1_Un2:
15497 53bca254719a Added semi-lattice locales and reorganized fold1 lemmas nipkow parents: 15487 diff changeset	1315	assumes A: "finite A" "A \<noteq> {}"
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1316	shows "finite B \<Longrightarrow> B \<noteq> {} \<Longrightarrow>
c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1317	fold1 times (A Un B) = fold1 times A * fold1 times B"
15497 53bca254719a Added semi-lattice locales and reorganized fold1 lemmas nipkow parents: 15487 diff changeset	1318	using A
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1319	proof(induct rule:finite_ne_induct)
15497 53bca254719a Added semi-lattice locales and reorganized fold1 lemmas nipkow parents: 15487 diff changeset	1320	case singleton thus ?case by simp
15484 2636ec211ec8 fold and fol1 changes nipkow parents: 15483 diff changeset	1321	next
26041 c2e15e65165f locales ACf, ACIf, ACIfSL and ACIfSLlin have been abandoned in favour of the existing algebraic classes ab_semigroup_mult, ab_semigroup_idem_mult, lower_semilattice (resp. uper_semilattice) and linorder haftmann parents: 25571 diff changeset	1322	case insert thus ?case by (simp add: mult_assoc)
18423 d7859164447f new lemmas nipkow parents: 17782 diff changeset	1323	qed
d7859164447f new lemmas nipkow parents: 17782 diff changeset	1324
d7859164447f new lemmas nipkow parents: 17782 diff changeset	1325
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1326	subsection {* Locales as mini-packages for fold operations *}
34007 aea892559fc5 tuned lattices theory fragements; generlized some lemmas from sets to lattices haftmann parents: 33960 diff changeset	1327
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1328	subsubsection {* The natural case *}
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1329
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1330	locale folding =
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1331	fixes f :: "'a \<Rightarrow> 'b \<Rightarrow> 'b"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1332	fixes F :: "'a set \<Rightarrow> 'b \<Rightarrow> 'b"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1333	assumes commute_comp: "f y \<circ> f x = f x \<circ> f y"
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1334	assumes eq_fold: "finite A \<Longrightarrow> F A s = fold f s A"
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1335	begin
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1336
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1337	lemma empty [simp]:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1338	"F {} = id"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1339	by (simp add: eq_fold fun_eq_iff)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1340
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1341	lemma insert [simp]:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1342	assumes "finite A" and "x \<notin> A"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1343	shows "F (insert x A) = F A \<circ> f x"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1344	proof -
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1345	interpret fun_left_comm f proof
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1346	qed (insert commute_comp, simp add: fun_eq_iff)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1347	from fold_insert2 assms
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1348	have "\<And>s. fold f s (insert x A) = fold f (f x s) A" .
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1349	with `finite A` show ?thesis by (simp add: eq_fold fun_eq_iff)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1350	qed
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1351
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1352	lemma remove:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1353	assumes "finite A" and "x \<in> A"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1354	shows "F A = F (A - {x}) \<circ> f x"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1355	proof -
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1356	from `x \<in> A` obtain B where A: "A = insert x B" and "x \<notin> B"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1357	by (auto dest: mk_disjoint_insert)
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1358	moreover from `finite A` this have "finite B" by simp
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1359	ultimately show ?thesis by simp
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1360	qed
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1361
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1362	lemma insert_remove:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1363	assumes "finite A"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1364	shows "F (insert x A) = F (A - {x}) \<circ> f x"
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1365	using assms by (cases "x \<in> A") (simp_all add: remove insert_absorb)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1366
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1367	lemma commute_left_comp:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1368	"f y \<circ> (f x \<circ> g) = f x \<circ> (f y \<circ> g)"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1369	by (simp add: o_assoc commute_comp)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1370
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1371	lemma commute_comp':
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1372	assumes "finite A"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1373	shows "f x \<circ> F A = F A \<circ> f x"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1374	using assms by (induct A)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1375	(simp, simp del: o_apply add: o_assoc, simp del: o_apply add: o_assoc [symmetric] commute_comp)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1376
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1377	lemma commute_left_comp':
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1378	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1379	shows "f x \<circ> (F A \<circ> g) = F A \<circ> (f x \<circ> g)"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1380	using assms by (simp add: o_assoc commute_comp')
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1381
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1382	lemma commute_comp'':
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1383	assumes "finite A" and "finite B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1384	shows "F B \<circ> F A = F A \<circ> F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1385	using assms by (induct A)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1386	(simp_all add: o_assoc, simp add: o_assoc [symmetric] commute_comp')
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1387
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1388	lemma commute_left_comp'':
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1389	assumes "finite A" and "finite B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1390	shows "F B \<circ> (F A \<circ> g) = F A \<circ> (F B \<circ> g)"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1391	using assms by (simp add: o_assoc commute_comp'')
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1392
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1393	lemmas commute_comps = o_assoc [symmetric] commute_comp commute_left_comp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1394	commute_comp' commute_left_comp' commute_comp'' commute_left_comp''
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1395
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1396	lemma union_inter:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1397	assumes "finite A" and "finite B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1398	shows "F (A \<union> B) \<circ> F (A \<inter> B) = F A \<circ> F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1399	using assms by (induct A)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1400	(simp_all del: o_apply add: insert_absorb Int_insert_left commute_comps,
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1401	simp add: o_assoc)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1402
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1403	lemma union:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1404	assumes "finite A" and "finite B"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1405	and "A \<inter> B = {}"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1406	shows "F (A \<union> B) = F A \<circ> F B"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1407	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1408	from union_inter `finite A` `finite B` have "F (A \<union> B) \<circ> F (A \<inter> B) = F A \<circ> F B" .
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1409	with `A \<inter> B = {}` show ?thesis by simp
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1410	qed
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1411
34007 aea892559fc5 tuned lattices theory fragements; generlized some lemmas from sets to lattices haftmann parents: 33960 diff changeset	1412	end
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1413
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1414
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1415	subsubsection {* The natural case with idempotency *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1416
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1417	locale folding_idem = folding +
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1418	assumes idem_comp: "f x \<circ> f x = f x"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1419	begin
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1420
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1421	lemma idem_left_comp:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1422	"f x \<circ> (f x \<circ> g) = f x \<circ> g"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1423	by (simp add: o_assoc idem_comp)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1424
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1425	lemma in_comp_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1426	assumes "finite A" and "x \<in> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1427	shows "F A \<circ> f x = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1428	using assms by (induct A)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1429	(auto simp add: commute_comps idem_comp, simp add: commute_left_comp' [symmetric] commute_comp')
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1430
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1431	lemma subset_comp_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1432	assumes "finite A" and "B \<subseteq> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1433	shows "F A \<circ> F B = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1434	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1435	from assms have "finite B" by (blast dest: finite_subset)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1436	then show ?thesis using `B \<subseteq> A` by (induct B)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1437	(simp_all add: o_assoc in_comp_idem `finite A`)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1438	qed
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1439
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1440	declare insert [simp del]
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1441
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1442	lemma insert_idem [simp]:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1443	assumes "finite A"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1444	shows "F (insert x A) = F A \<circ> f x"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1445	using assms by (cases "x \<in> A") (simp_all add: insert in_comp_idem insert_absorb)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1446
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1447	lemma union_idem:
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1448	assumes "finite A" and "finite B"
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1449	shows "F (A \<union> B) = F A \<circ> F B"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1450	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1451	from assms have "finite (A \<union> B)" and "A \<inter> B \<subseteq> A \<union> B" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1452	then have "F (A \<union> B) \<circ> F (A \<inter> B) = F (A \<union> B)" by (rule subset_comp_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1453	with assms show ?thesis by (simp add: union_inter)
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1454	qed
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1455
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1456	end
99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1457
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1458
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1459	subsubsection {* The image case with fixed function *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1460
35796 2d44d2a1f68e corrected disastrous syntax declarations haftmann parents: 35722 diff changeset	1461	no_notation times (infixl "*" 70)
2d44d2a1f68e corrected disastrous syntax declarations haftmann parents: 35722 diff changeset	1462	no_notation Groups.one ("1")
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1463
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1464	locale folding_image_simple = comm_monoid +
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1465	fixes g :: "('b \<Rightarrow> 'a)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1466	fixes F :: "'b set \<Rightarrow> 'a"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1467	assumes eq_fold_g: "finite A \<Longrightarrow> F A = fold_image f g 1 A"
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1468	begin
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1469
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1470	lemma empty [simp]:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1471	"F {} = 1"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1472	by (simp add: eq_fold_g)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1473
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1474	lemma insert [simp]:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1475	assumes "finite A" and "x \<notin> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1476	shows "F (insert x A) = g x * F A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1477	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1478	interpret fun_left_comm "%x y. (g x) * y" proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1479	qed (simp add: ac_simps)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1480	with assms have "fold_image (op ) g 1 (insert x A) = g x fold_image (op *) g 1 A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1481	by (simp add: fold_image_def)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1482	with `finite A` show ?thesis by (simp add: eq_fold_g)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1483	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1484
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1485	lemma remove:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1486	assumes "finite A" and "x \<in> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1487	shows "F A = g x * F (A - {x})"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1488	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1489	from `x \<in> A` obtain B where A: "A = insert x B" and "x \<notin> B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1490	by (auto dest: mk_disjoint_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1491	moreover from `finite A` this have "finite B" by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1492	ultimately show ?thesis by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1493	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1494
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1495	lemma insert_remove:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1496	assumes "finite A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1497	shows "F (insert x A) = g x * F (A - {x})"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1498	using assms by (cases "x \<in> A") (simp_all add: remove insert_absorb)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1499
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1500	lemma neutral:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1501	assumes "finite A" and "\<forall>x\<in>A. g x = 1"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1502	shows "F A = 1"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1503	using assms by (induct A) simp_all
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1504
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1505	lemma union_inter:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1506	assumes "finite A" and "finite B"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1507	shows "F (A \<union> B) * F (A \<inter> B) = F A * F B"
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1508	using assms proof (induct A)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1509	case empty then show ?case by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1510	next
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1511	case (insert x A) then show ?case
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1512	by (auto simp add: insert_absorb Int_insert_left commute [of _ "g x"] assoc left_commute)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1513	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1514
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1515	corollary union_inter_neutral:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1516	assumes "finite A" and "finite B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1517	and I0: "\<forall>x \<in> A\<inter>B. g x = 1"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1518	shows "F (A \<union> B) = F A * F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1519	using assms by (simp add: union_inter [symmetric] neutral)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1520
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1521	corollary union_disjoint:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1522	assumes "finite A" and "finite B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1523	assumes "A \<inter> B = {}"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1524	shows "F (A \<union> B) = F A * F B"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1525	using assms by (simp add: union_inter_neutral)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1526
35719 99b6152aedf5 split off theory Big_Operators from theory Finite_Set haftmann parents: 35577 diff changeset	1527	end
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1528
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1529
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1530	subsubsection {* The image case with flexible function *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1531
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1532	locale folding_image = comm_monoid +
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1533	fixes F :: "('b \<Rightarrow> 'a) \<Rightarrow> 'b set \<Rightarrow> 'a"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1534	assumes eq_fold: "\<And>g. finite A \<Longrightarrow> F g A = fold_image f g 1 A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1535
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1536	sublocale folding_image < folding_image_simple "op *" 1 g "F g" proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1537	qed (fact eq_fold)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1538
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1539	context folding_image
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1540	begin
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1541
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1542	lemma reindex: (* FIXME polymorhism *)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1543	assumes "finite A" and "inj_on h A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1544	shows "F g (h ` A) = F (g \<circ> h) A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1545	using assms by (induct A) auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1546
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1547	lemma cong:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1548	assumes "finite A" and "\<And>x. x \<in> A \<Longrightarrow> g x = h x"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1549	shows "F g A = F h A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1550	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1551	from assms have "ALL C. C <= A --> (ALL x:C. g x = h x) --> F g C = F h C"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1552	apply - apply (erule finite_induct) apply simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1553	apply (simp add: subset_insert_iff, clarify)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1554	apply (subgoal_tac "finite C")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1555	prefer 2 apply (blast dest: finite_subset [COMP swap_prems_rl])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1556	apply (subgoal_tac "C = insert x (C - {x})")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1557	prefer 2 apply blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1558	apply (erule ssubst)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1559	apply (drule spec)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1560	apply (erule (1) notE impE)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1561	apply (simp add: Ball_def del: insert_Diff_single)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1562	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1563	with assms show ?thesis by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1564	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1565
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1566	lemma UNION_disjoint:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1567	assumes "finite I" and "\<forall>i\<in>I. finite (A i)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1568	and "\<forall>i\<in>I. \<forall>j\<in>I. i \<noteq> j \<longrightarrow> A i \<inter> A j = {}"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1569	shows "F g (UNION I A) = F (F g \<circ> A) I"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1570	apply (insert assms)
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1571	apply (induct rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1572	apply simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1573	apply atomize
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1574	apply (subgoal_tac "\<forall>i\<in>Fa. x \<noteq> i")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1575	prefer 2 apply blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1576	apply (subgoal_tac "A x Int UNION Fa A = {}")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1577	prefer 2 apply blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1578	apply (simp add: union_disjoint)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1579	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1580
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1581	lemma distrib:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1582	assumes "finite A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1583	shows "F (\<lambda>x. g x * h x) A = F g A * F h A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1584	using assms by (rule finite_induct) (simp_all add: assoc commute left_commute)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1585
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1586	lemma related:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1587	assumes Re: "R 1 1"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1588	and Rop: "\<forall>x1 y1 x2 y2. R x1 x2 \<and> R y1 y2 \<longrightarrow> R (x1 * y1) (x2 * y2)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1589	and fS: "finite S" and Rfg: "\<forall>x\<in>S. R (h x) (g x)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1590	shows "R (F h S) (F g S)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1591	using fS by (rule finite_subset_induct) (insert assms, auto)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1592
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1593	lemma eq_general:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1594	assumes fS: "finite S"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1595	and h: "\<forall>y\<in>S'. \<exists>!x. x \<in> S \<and> h x = y"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1596	and f12: "\<forall>x\<in>S. h x \<in> S' \<and> f2 (h x) = f1 x"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1597	shows "F f1 S = F f2 S'"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1598	proof-
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1599	from h f12 have hS: "h ` S = S'" by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1600	{fix x y assume H: "x \<in> S" "y \<in> S" "h x = h y"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1601	from f12 h H have "x = y" by auto }
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1602	hence hinj: "inj_on h S" unfolding inj_on_def Ex1_def by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1603	from f12 have th: "\<And>x. x \<in> S \<Longrightarrow> (f2 \<circ> h) x = f1 x" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1604	from hS have "F f2 S' = F f2 (h ` S)" by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1605	also have "\<dots> = F (f2 o h) S" using reindex [OF fS hinj, of f2] .
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1606	also have "\<dots> = F f1 S " using th cong [OF fS, of "f2 o h" f1]
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1607	by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1608	finally show ?thesis ..
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1609	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1610
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1611	lemma eq_general_inverses:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1612	assumes fS: "finite S"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1613	and kh: "\<And>y. y \<in> T \<Longrightarrow> k y \<in> S \<and> h (k y) = y"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1614	and hk: "\<And>x. x \<in> S \<Longrightarrow> h x \<in> T \<and> k (h x) = x \<and> g (h x) = j x"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1615	shows "F j S = F g T"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1616	(* metis solves it, but not yet available here *)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1617	apply (rule eq_general [OF fS, of T h g j])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1618	apply (rule ballI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1619	apply (frule kh)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1620	apply (rule ex1I[])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1621	apply blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1622	apply clarsimp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1623	apply (drule hk) apply simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1624	apply (rule sym)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1625	apply (erule conjunct1[OF conjunct2[OF hk]])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1626	apply (rule ballI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1627	apply (drule hk)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1628	apply blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1629	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1630
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1631	end
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1632
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1633
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1634	subsubsection {* The image case with fixed function and idempotency *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1635
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1636	locale folding_image_simple_idem = folding_image_simple +
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1637	assumes idem: "x * x = x"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1638
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1639	sublocale folding_image_simple_idem < semilattice proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1640	qed (fact idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1641
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1642	context folding_image_simple_idem
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1643	begin
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1644
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1645	lemma in_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1646	assumes "finite A" and "x \<in> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1647	shows "g x * F A = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1648	using assms by (induct A) (auto simp add: left_commute)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1649
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1650	lemma subset_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1651	assumes "finite A" and "B \<subseteq> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1652	shows "F B * F A = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1653	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1654	from assms have "finite B" by (blast dest: finite_subset)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1655	then show ?thesis using `B \<subseteq> A` by (induct B)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1656	(auto simp add: assoc in_idem `finite A`)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1657	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1658
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1659	declare insert [simp del]
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1660
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1661	lemma insert_idem [simp]:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1662	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1663	shows "F (insert x A) = g x * F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1664	using assms by (cases "x \<in> A") (simp_all add: insert in_idem insert_absorb)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1665
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1666	lemma union_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1667	assumes "finite A" and "finite B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1668	shows "F (A \<union> B) = F A * F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1669	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1670	from assms have "finite (A \<union> B)" and "A \<inter> B \<subseteq> A \<union> B" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1671	then have "F (A \<inter> B) * F (A \<union> B) = F (A \<union> B)" by (rule subset_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1672	with assms show ?thesis by (simp add: union_inter [of A B, symmetric] commute)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1673	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1674
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1675	end
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1676
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1677
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1678	subsubsection {* The image case with flexible function and idempotency *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1679
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1680	locale folding_image_idem = folding_image +
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1681	assumes idem: "x * x = x"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1682
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1683	sublocale folding_image_idem < folding_image_simple_idem "op *" 1 g "F g" proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1684	qed (fact idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1685
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1686
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1687	subsubsection {* The neutral-less case *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1688
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1689	locale folding_one = abel_semigroup +
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1690	fixes F :: "'a set \<Rightarrow> 'a"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1691	assumes eq_fold: "finite A \<Longrightarrow> F A = fold1 f A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1692	begin
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1693
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1694	lemma singleton [simp]:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1695	"F {x} = x"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1696	by (simp add: eq_fold)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1697
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1698	lemma eq_fold':
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1699	assumes "finite A" and "x \<notin> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1700	shows "F (insert x A) = fold (op *) x A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1701	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1702	interpret ab_semigroup_mult "op *" proof qed (simp_all add: ac_simps)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1703	with assms show ?thesis by (simp add: eq_fold fold1_eq_fold)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1704	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1705
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1706	lemma insert [simp]:
36637 74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1707	assumes "finite A" and "x \<notin> A" and "A \<noteq> {}"
74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1708	shows "F (insert x A) = x * F A"
74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1709	proof -
74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1710	from `A \<noteq> {}` obtain b where "b \<in> A" by blast
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1711	then obtain B where *: "A = insert b B" "b \<notin> B" by (blast dest: mk_disjoint_insert)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1712	with `finite A` have "finite B" by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1713	interpret fold: folding "op " "\<lambda>a b. fold (op ) b a" proof
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1714	qed (simp_all add: fun_eq_iff ac_simps)
d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1715	thm fold.commute_comp' [of B b, simplified fun_eq_iff, simplified]
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1716	from `finite B` fold.commute_comp' [of B x]
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1717	have "op * x \<circ> (\<lambda>b. fold op * b B) = (\<lambda>b. fold op * b B) \<circ> op * x" by simp
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1718	then have A: "x * fold op * b B = fold op * (b * x) B" by (simp add: fun_eq_iff commute)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1719	from `finite B` * fold.insert [of B b]
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1720	have "(\<lambda>x. fold op * x (insert b B)) = (\<lambda>x. fold op * x B) \<circ> op * b" by simp
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1721	then have B: "fold op * x (insert b B) = fold op * (b * x) B" by (simp add: fun_eq_iff)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1722	from A B assms * show ?thesis by (simp add: eq_fold' del: fold.insert)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1723	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1724
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1725	lemma remove:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1726	assumes "finite A" and "x \<in> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1727	shows "F A = (if A - {x} = {} then x else x * F (A - {x}))"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1728	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1729	from assms obtain B where "A = insert x B" and "x \<notin> B" by (blast dest: mk_disjoint_insert)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1730	with assms show ?thesis by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1731	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1732
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1733	lemma insert_remove:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1734	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1735	shows "F (insert x A) = (if A - {x} = {} then x else x * F (A - {x}))"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1736	using assms by (cases "x \<in> A") (simp_all add: insert_absorb remove)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1737
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1738	lemma union_disjoint:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1739	assumes "finite A" "A \<noteq> {}" and "finite B" "B \<noteq> {}" and "A \<inter> B = {}"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1740	shows "F (A \<union> B) = F A * F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1741	using assms by (induct A rule: finite_ne_induct) (simp_all add: ac_simps)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1742
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1743	lemma union_inter:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1744	assumes "finite A" and "finite B" and "A \<inter> B \<noteq> {}"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1745	shows "F (A \<union> B) * F (A \<inter> B) = F A * F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1746	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1747	from assms have "A \<noteq> {}" and "B \<noteq> {}" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1748	from `finite A` `A \<noteq> {}` `A \<inter> B \<noteq> {}` show ?thesis proof (induct A rule: finite_ne_induct)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1749	case (singleton x) then show ?case by (simp add: insert_absorb ac_simps)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1750	next
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1751	case (insert x A) show ?case proof (cases "x \<in> B")
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1752	case True then have "B \<noteq> {}" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1753	with insert True `finite B` show ?thesis by (cases "A \<inter> B = {}")
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1754	(simp_all add: insert_absorb ac_simps union_disjoint)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1755	next
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1756	case False with insert have "F (A \<union> B) * F (A \<inter> B) = F A * F B" by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1757	moreover from False `finite B` insert have "finite (A \<union> B)" "x \<notin> A \<union> B" "A \<union> B \<noteq> {}"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1758	by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1759	ultimately show ?thesis using False `finite A` `x \<notin> A` `A \<noteq> {}` by (simp add: assoc)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1760	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1761	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1762	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1763
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1764	lemma closed:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1765	assumes "finite A" "A \<noteq> {}" and elem: "\<And>x y. x * y \<in> {x, y}"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1766	shows "F A \<in> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1767	using `finite A` `A \<noteq> {}` proof (induct rule: finite_ne_induct)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1768	case singleton then show ?case by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1769	next
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1770	case insert with elem show ?case by force
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1771	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1772
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1773	end
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1774
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1775
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1776	subsubsection {* The neutral-less case with idempotency *}
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1777
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1778	locale folding_one_idem = folding_one +
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1779	assumes idem: "x * x = x"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1780
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1781	sublocale folding_one_idem < semilattice proof
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1782	qed (fact idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1783
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1784	context folding_one_idem
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1785	begin
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1786
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1787	lemma in_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1788	assumes "finite A" and "x \<in> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1789	shows "x * F A = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1790	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1791	from assms have "A \<noteq> {}" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1792	with `finite A` show ?thesis using `x \<in> A` by (induct A rule: finite_ne_induct) (auto simp add: ac_simps)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1793	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1794
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1795	lemma subset_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1796	assumes "finite A" "B \<noteq> {}" and "B \<subseteq> A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1797	shows "F B * F A = F A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1798	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1799	from assms have "finite B" by (blast dest: finite_subset)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1800	then show ?thesis using `B \<noteq> {}` `B \<subseteq> A` by (induct B rule: finite_ne_induct)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1801	(simp_all add: assoc in_idem `finite A`)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1802	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1803
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1804	lemma eq_fold_idem':
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1805	assumes "finite A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1806	shows "F (insert a A) = fold (op *) a A"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1807	proof -
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1808	interpret ab_semigroup_idem_mult "op *" proof qed (simp_all add: ac_simps)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1809	with assms show ?thesis by (simp add: eq_fold fold1_eq_fold_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1810	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1811
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1812	lemma insert_idem [simp]:
36637 74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1813	assumes "finite A" and "A \<noteq> {}"
74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1814	shows "F (insert x A) = x * F A"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1815	proof (cases "x \<in> A")
36637 74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1816	case False from `finite A` `x \<notin> A` `A \<noteq> {}` show ?thesis by (rule insert)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1817	next
36637 74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1818	case True
74a5c04bf29d avoid if on rhs of default simp rules haftmann parents: 36635 diff changeset	1819	from `finite A` `A \<noteq> {}` show ?thesis by (simp add: in_idem insert_absorb True)
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1820	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1821
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1822	lemma union_idem:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1823	assumes "finite A" "A \<noteq> {}" and "finite B" "B \<noteq> {}"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1824	shows "F (A \<union> B) = F A * F B"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1825	proof (cases "A \<inter> B = {}")
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1826	case True with assms show ?thesis by (simp add: union_disjoint)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1827	next
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1828	case False
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1829	from assms have "finite (A \<union> B)" and "A \<inter> B \<subseteq> A \<union> B" by auto
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1830	with False have "F (A \<inter> B) * F (A \<union> B) = F (A \<union> B)" by (auto intro: subset_idem)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1831	with assms False show ?thesis by (simp add: union_inter [of A B, symmetric] commute)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1832	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1833
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1834	lemma hom_commute:
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1835	assumes hom: "\<And>x y. h (x * y) = h x * h y"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1836	and N: "finite N" "N \<noteq> {}" shows "h (F N) = F (h ` N)"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1837	using N proof (induct rule: finite_ne_induct)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1838	case singleton thus ?case by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1839	next
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1840	case (insert n N)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1841	then have "h (F (insert n N)) = h (n * F N)" by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1842	also have "\<dots> = h n * h (F N)" by (rule hom)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1843	also have "h (F N) = F (h ` N)" by(rule insert)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1844	also have "h n * \<dots> = F (insert (h n) (h ` N))"
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1845	using insert by(simp)
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1846	also have "insert (h n) (h ` N) = h ` insert n N" by simp
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1847	finally show ?case .
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1848	qed
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1849
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1850	end
d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1851
35796 2d44d2a1f68e corrected disastrous syntax declarations haftmann parents: 35722 diff changeset	1852	notation times (infixl "*" 70)
2d44d2a1f68e corrected disastrous syntax declarations haftmann parents: 35722 diff changeset	1853	notation Groups.one ("1")
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1854
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1855
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1856	subsection {* Finite cardinality *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1857
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1858	text {* This definition, although traditional, is ugly to work with:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1859	@{text "card A == LEAST n. EX f. A = {f i \| i. i < n}"}.
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1860	But now that we have @{text fold_image} things are easy:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1861	*}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1862
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1863	definition card :: "'a set \<Rightarrow> nat" where
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1864	"card A = (if finite A then fold_image (op +) (\<lambda>x. 1) 0 A else 0)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1865
37770 cddb3106adb8 avoid explicit mandatory prefix markers when prefixes are mandatory implicitly haftmann parents: 37767 diff changeset	1866	interpretation card: folding_image_simple "op +" 0 "\<lambda>x. 1" card proof
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1867	qed (simp add: card_def)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1868
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1869	lemma card_infinite [simp]:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1870	"\<not> finite A \<Longrightarrow> card A = 0"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1871	by (simp add: card_def)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1872
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1873	lemma card_empty:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1874	"card {} = 0"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1875	by (fact card.empty)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1876
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1877	lemma card_insert_disjoint:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1878	"finite A ==> x \<notin> A ==> card (insert x A) = Suc (card A)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1879	by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1880
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1881	lemma card_insert_if:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1882	"finite A ==> card (insert x A) = (if x \<in> A then card A else Suc (card A))"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1883	by auto (simp add: card.insert_remove card.remove)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1884
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1885	lemma card_ge_0_finite:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1886	"card A > 0 \<Longrightarrow> finite A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1887	by (rule ccontr) simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1888
35828 46cfc4b8112e now use "Named_Thms" for "noatp", and renamed "noatp" to "no_atp" blanchet parents: 35796 diff changeset	1889	lemma card_0_eq [simp, no_atp]:
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1890	"finite A \<Longrightarrow> card A = 0 \<longleftrightarrow> A = {}"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1891	by (auto dest: mk_disjoint_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1892
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1893	lemma finite_UNIV_card_ge_0:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1894	"finite (UNIV :: 'a set) \<Longrightarrow> card (UNIV :: 'a set) > 0"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1895	by (rule ccontr) simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1896
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1897	lemma card_eq_0_iff:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1898	"card A = 0 \<longleftrightarrow> A = {} \<or> \<not> finite A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1899	by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1900
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1901	lemma card_gt_0_iff:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1902	"0 < card A \<longleftrightarrow> A \<noteq> {} \<and> finite A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1903	by (simp add: neq0_conv [symmetric] card_eq_0_iff)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1904
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1905	lemma card_Suc_Diff1: "finite A ==> x: A ==> Suc (card (A - {x})) = card A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1906	apply(rule_tac t = A in insert_Diff [THEN subst], assumption)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1907	apply(simp del:insert_Diff_single)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1908	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1909
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1910	lemma card_Diff_singleton:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1911	"finite A ==> x: A ==> card (A - {x}) = card A - 1"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1912	by (simp add: card_Suc_Diff1 [symmetric])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1913
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1914	lemma card_Diff_singleton_if:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1915	"finite A ==> card (A-{x}) = (if x : A then card A - 1 else card A)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1916	by (simp add: card_Diff_singleton)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1917
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1918	lemma card_Diff_insert[simp]:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1919	assumes "finite A" and "a:A" and "a ~: B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1920	shows "card(A - insert a B) = card(A - B) - 1"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1921	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1922	have "A - insert a B = (A - B) - {a}" using assms by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1923	then show ?thesis using assms by(simp add:card_Diff_singleton)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1924	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1925
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1926	lemma card_insert: "finite A ==> card (insert x A) = Suc (card (A - {x}))"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1927	by (simp add: card_insert_if card_Suc_Diff1 del:card_Diff_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1928
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1929	lemma card_insert_le: "finite A ==> card A <= card (insert x A)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1930	by (simp add: card_insert_if)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1931
41987 4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	1932	lemma card_Collect_less_nat[simp]: "card{i::nat. i < n} = n"
4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	1933	by (induct n) (simp_all add:less_Suc_eq Collect_disj_eq)
4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	1934
41988 c2583bbb92f5 tuned lemma nipkow parents: 41987 diff changeset	1935	lemma card_Collect_le_nat[simp]: "card{i::nat. i <= n} = Suc n"
41987 4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	1936	using card_Collect_less_nat[of "Suc n"] by(simp add: less_Suc_eq_le)
4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	1937
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1938	lemma card_mono:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1939	assumes "finite B" and "A \<subseteq> B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1940	shows "card A \<le> card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1941	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1942	from assms have "finite A" by (auto intro: finite_subset)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1943	then show ?thesis using assms proof (induct A arbitrary: B)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1944	case empty then show ?case by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1945	next
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1946	case (insert x A)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1947	then have "x \<in> B" by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1948	from insert have "A \<subseteq> B - {x}" and "finite (B - {x})" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1949	with insert.hyps have "card A \<le> card (B - {x})" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1950	with `finite A` `x \<notin> A` `finite B` `x \<in> B` show ?case by simp (simp only: card.remove)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1951	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1952	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1953
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1954	lemma card_seteq: "finite B ==> (!!A. A <= B ==> card B <= card A ==> A = B)"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1955	apply (induct rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1956	apply simp
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	1957	apply clarify
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1958	apply (subgoal_tac "finite A & A - {x} <= F")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1959	prefer 2 apply (blast intro: finite_subset, atomize)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1960	apply (drule_tac x = "A - {x}" in spec)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1961	apply (simp add: card_Diff_singleton_if split add: split_if_asm)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1962	apply (case_tac "card A", auto)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1963	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1964
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1965	lemma psubset_card_mono: "finite B ==> A < B ==> card A < card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1966	apply (simp add: psubset_eq linorder_not_le [symmetric])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1967	apply (blast dest: card_seteq)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1968	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1969
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1970	lemma card_Un_Int: "finite A ==> finite B
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1971	==> card A + card B = card (A Un B) + card (A Int B)"
35817 d8b8527102f5 added locales folding_one_(idem); various streamlining and tuning haftmann parents: 35796 diff changeset	1972	by (fact card.union_inter [symmetric])
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1973
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1974	lemma card_Un_disjoint: "finite A ==> finite B
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1975	==> A Int B = {} ==> card (A Un B) = card A + card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1976	by (fact card.union_disjoint)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1977
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1978	lemma card_Diff_subset:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1979	assumes "finite B" and "B \<subseteq> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1980	shows "card (A - B) = card A - card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1981	proof (cases "finite A")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1982	case False with assms show ?thesis by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1983	next
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1984	case True with assms show ?thesis by (induct B arbitrary: A) simp_all
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1985	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1986
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1987	lemma card_Diff_subset_Int:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1988	assumes AB: "finite (A \<inter> B)" shows "card (A - B) = card A - card (A \<inter> B)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1989	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1990	have "A - B = A - A \<inter> B" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1991	thus ?thesis
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1992	by (simp add: card_Diff_subset AB)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1993	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	1994
40716 a92d744bca5f new lemma nipkow parents: 40703 diff changeset	1995	lemma diff_card_le_card_Diff:
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	1996	assumes "finite B" shows "card A - card B \<le> card(A - B)"
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	1997	proof-
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	1998	have "card A - card B \<le> card A - card (A \<inter> B)"
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	1999	using card_mono[OF assms Int_lower2, of A] by arith
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	2000	also have "\<dots> = card(A-B)" using assms by(simp add: card_Diff_subset_Int)
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	2001	finally show ?thesis .
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	2002	qed
a92d744bca5f new lemma nipkow parents: 40703 diff changeset	2003
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2004	lemma card_Diff1_less: "finite A ==> x: A ==> card (A - {x}) < card A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2005	apply (rule Suc_less_SucD)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2006	apply (simp add: card_Suc_Diff1 del:card_Diff_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2007	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2008
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2009	lemma card_Diff2_less:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2010	"finite A ==> x: A ==> y: A ==> card (A - {x} - {y}) < card A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2011	apply (case_tac "x = y")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2012	apply (simp add: card_Diff1_less del:card_Diff_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2013	apply (rule less_trans)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2014	prefer 2 apply (auto intro!: card_Diff1_less simp del:card_Diff_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2015	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2016
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2017	lemma card_Diff1_le: "finite A ==> card (A - {x}) <= card A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2018	apply (case_tac "x : A")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2019	apply (simp_all add: card_Diff1_less less_imp_le)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2020	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2021
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2022	lemma card_psubset: "finite B ==> A \<subseteq> B ==> card A < card B ==> A < B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2023	by (erule psubsetI, blast)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2024
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2025	lemma insert_partition:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2026	"\<lbrakk> x \<notin> F; \<forall>c1 \<in> insert x F. \<forall>c2 \<in> insert x F. c1 \<noteq> c2 \<longrightarrow> c1 \<inter> c2 = {} \<rbrakk>
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2027	\<Longrightarrow> x \<inter> \<Union> F = {}"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2028	by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2029
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2030	lemma finite_psubset_induct[consumes 1, case_names psubset]:
36079 fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2031	assumes fin: "finite A"
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2032	and major: "\<And>A. finite A \<Longrightarrow> (\<And>B. B \<subset> A \<Longrightarrow> P B) \<Longrightarrow> P A"
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2033	shows "P A"
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2034	using fin
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2035	proof (induct A taking: card rule: measure_induct_rule)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2036	case (less A)
36079 fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2037	have fin: "finite A" by fact
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2038	have ih: "\<And>B. \<lbrakk>card B < card A; finite B\<rbrakk> \<Longrightarrow> P B" by fact
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2039	{ fix B
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2040	assume asm: "B \<subset> A"
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2041	from asm have "card B < card A" using psubset_card_mono fin by blast
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2042	moreover
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2043	from asm have "B \<subseteq> A" by auto
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2044	then have "finite B" using fin finite_subset by blast
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2045	ultimately
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2046	have "P B" using ih by simp
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2047	}
fa0e354e6a39 simplified induction case in finite_psubset_induct; tuned the proof that uses this induction principle Christian Urban <urbanc@in.tum.de> parents: 36045 diff changeset	2048	with fin show "P A" using major by blast
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2049	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2050
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2051	text{* main cardinality theorem *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2052	lemma card_partition [rule_format]:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2053	"finite C ==>
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2054	finite (\<Union> C) -->
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2055	(\<forall>c\<in>C. card c = k) -->
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2056	(\<forall>c1 \<in> C. \<forall>c2 \<in> C. c1 \<noteq> c2 --> c1 \<inter> c2 = {}) -->
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2057	k * card(C) = card (\<Union> C)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2058	apply (erule finite_induct, simp)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2059	apply (simp add: card_Un_disjoint insert_partition
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2060	finite_subset [of _ "\<Union> (insert x F)"])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2061	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2062
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2063	lemma card_eq_UNIV_imp_eq_UNIV:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2064	assumes fin: "finite (UNIV :: 'a set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2065	and card: "card A = card (UNIV :: 'a set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2066	shows "A = (UNIV :: 'a set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2067	proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2068	show "A \<subseteq> UNIV" by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2069	show "UNIV \<subseteq> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2070	proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2071	fix x
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2072	show "x \<in> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2073	proof (rule ccontr)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2074	assume "x \<notin> A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2075	then have "A \<subset> UNIV" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2076	with fin have "card A < card (UNIV :: 'a set)" by (fact psubset_card_mono)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2077	with card show False by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2078	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2079	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2080	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2081
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2082	text{The form of a finite set of given cardinality}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2083
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2084	lemma card_eq_SucD:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2085	assumes "card A = Suc k"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2086	shows "\<exists>b B. A = insert b B & b \<notin> B & card B = k & (k=0 \<longrightarrow> B={})"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2087	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2088	have fin: "finite A" using assms by (auto intro: ccontr)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2089	moreover have "card A \<noteq> 0" using assms by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2090	ultimately obtain b where b: "b \<in> A" by auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2091	show ?thesis
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2092	proof (intro exI conjI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2093	show "A = insert b (A-{b})" using b by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2094	show "b \<notin> A - {b}" by blast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2095	show "card (A - {b}) = k" and "k = 0 \<longrightarrow> A - {b} = {}"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2096	using assms b fin by(fastsimp dest:mk_disjoint_insert)+
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2097	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2098	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2099
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2100	lemma card_Suc_eq:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2101	"(card A = Suc k) =
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2102	(\<exists>b B. A = insert b B & b \<notin> B & card B = k & (k=0 \<longrightarrow> B={}))"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2103	apply(rule iffI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2104	apply(erule card_eq_SucD)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2105	apply(auto)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2106	apply(subst card_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2107	apply(auto intro:ccontr)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2108	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2109
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2110	lemma finite_fun_UNIVD2:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2111	assumes fin: "finite (UNIV :: ('a \<Rightarrow> 'b) set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2112	shows "finite (UNIV :: 'b set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2113	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2114	from fin have "finite (range (\<lambda>f :: 'a \<Rightarrow> 'b. f arbitrary))"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2115	by(rule finite_imageI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2116	moreover have "UNIV = range (\<lambda>f :: 'a \<Rightarrow> 'b. f arbitrary)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2117	by(rule UNIV_eq_I) auto
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2118	ultimately show "finite (UNIV :: 'b set)" by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2119	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2120
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2121	lemma card_UNIV_unit: "card (UNIV :: unit set) = 1"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2122	unfolding UNIV_unit by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2123
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2124
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2125	subsubsection {* Cardinality of image *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2126
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2127	lemma card_image_le: "finite A ==> card (f ` A) <= card A"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2128	apply (induct rule: finite_induct)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2129	apply simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2130	apply (simp add: le_SucI card_insert_if)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2131	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2132
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2133	lemma card_image:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2134	assumes "inj_on f A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2135	shows "card (f ` A) = card A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2136	proof (cases "finite A")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2137	case True then show ?thesis using assms by (induct A) simp_all
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2138	next
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2139	case False then have "\<not> finite (f ` A)" using assms by (auto dest: finite_imageD)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2140	with False show ?thesis by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2141	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2142
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2143	lemma bij_betw_same_card: "bij_betw f A B \<Longrightarrow> card A = card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2144	by(auto simp: card_image bij_betw_def)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2145
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2146	lemma endo_inj_surj: "finite A ==> f ` A \<subseteq> A ==> inj_on f A ==> f ` A = A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2147	by (simp add: card_seteq card_image)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2148
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2149	lemma eq_card_imp_inj_on:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2150	"[\| finite A; card(f ` A) = card A \|] ==> inj_on f A"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2151	apply (induct rule:finite_induct)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2152	apply simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2153	apply(frule card_image_le[where f = f])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2154	apply(simp add:card_insert_if split:if_splits)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2155	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2156
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2157	lemma inj_on_iff_eq_card:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2158	"finite A ==> inj_on f A = (card(f ` A) = card A)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2159	by(blast intro: card_image eq_card_imp_inj_on)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2160
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2161
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2162	lemma card_inj_on_le:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2163	"[\|inj_on f A; f ` A \<subseteq> B; finite B \|] ==> card A \<le> card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2164	apply (subgoal_tac "finite A")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2165	apply (force intro: card_mono simp add: card_image [symmetric])
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2166	apply (blast intro: finite_imageD dest: finite_subset)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2167	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2168
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2169	lemma card_bij_eq:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2170	"[\|inj_on f A; f ` A \<subseteq> B; inj_on g B; g ` B \<subseteq> A;
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2171	finite A; finite B \|] ==> card A = card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2172	by (auto intro: le_antisym card_inj_on_le)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2173
40703 d1fc454d6735 Move some missing lemmas from Andrei Popescus 'Ordinals and Cardinals' AFP entry to the HOL-image. hoelzl parents: 40702 diff changeset	2174	lemma bij_betw_finite:
d1fc454d6735 Move some missing lemmas from Andrei Popescus 'Ordinals and Cardinals' AFP entry to the HOL-image. hoelzl parents: 40702 diff changeset	2175	assumes "bij_betw f A B"
d1fc454d6735 Move some missing lemmas from Andrei Popescus 'Ordinals and Cardinals' AFP entry to the HOL-image. hoelzl parents: 40702 diff changeset	2176	shows "finite A \<longleftrightarrow> finite B"
d1fc454d6735 Move some missing lemmas from Andrei Popescus 'Ordinals and Cardinals' AFP entry to the HOL-image. hoelzl parents: 40702 diff changeset	2177	using assms unfolding bij_betw_def
d1fc454d6735 Move some missing lemmas from Andrei Popescus 'Ordinals and Cardinals' AFP entry to the HOL-image. hoelzl parents: 40702 diff changeset	2178	using finite_imageD[of f A] by auto
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2179
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2180
37466 87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2181	subsubsection {* Pigeonhole Principles *}
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2182
40311 994e784ca17a removed assumption nipkow parents: 39302 diff changeset	2183	lemma pigeonhole: "card A > card(f ` A) \<Longrightarrow> ~ inj_on f A "
37466 87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2184	by (auto dest: card_image less_irrefl_nat)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2185
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2186	lemma pigeonhole_infinite:
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2187	assumes "~ finite A" and "finite(f`A)"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2188	shows "EX a0:A. ~finite{a:A. f a = f a0}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2189	proof -
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2190	have "finite(f`A) \<Longrightarrow> ~ finite A \<Longrightarrow> EX a0:A. ~finite{a:A. f a = f a0}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2191	proof(induct "f`A" arbitrary: A rule: finite_induct)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2192	case empty thus ?case by simp
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2193	next
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2194	case (insert b F)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2195	show ?case
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2196	proof cases
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2197	assume "finite{a:A. f a = b}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2198	hence "~ finite(A - {a:A. f a = b})" using `\<not> finite A` by simp
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2199	also have "A - {a:A. f a = b} = {a:A. f a \<noteq> b}" by blast
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2200	finally have "~ finite({a:A. f a \<noteq> b})" .
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2201	from insert(3)[OF _ this]
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2202	show ?thesis using insert(2,4) by simp (blast intro: rev_finite_subset)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2203	next
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2204	assume 1: "~finite{a:A. f a = b}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2205	hence "{a \<in> A. f a = b} \<noteq> {}" by force
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2206	thus ?thesis using 1 by blast
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2207	qed
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2208	qed
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2209	from this[OF assms(2,1)] show ?thesis .
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2210	qed
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2211
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2212	lemma pigeonhole_infinite_rel:
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2213	assumes "~finite A" and "finite B" and "ALL a:A. EX b:B. R a b"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2214	shows "EX b:B. ~finite{a:A. R a b}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2215	proof -
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2216	let ?F = "%a. {b:B. R a b}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2217	from finite_Pow_iff[THEN iffD2, OF `finite B`]
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2218	have "finite(?F ` A)" by(blast intro: rev_finite_subset)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2219	from pigeonhole_infinite[where f = ?F, OF assms(1) this]
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2220	obtain a0 where "a0\<in>A" and 1: "\<not> finite {a\<in>A. ?F a = ?F a0}" ..
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2221	obtain b0 where "b0 : B" and "R a0 b0" using `a0:A` assms(3) by blast
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2222	{ assume "finite{a:A. R a b0}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2223	then have "finite {a\<in>A. ?F a = ?F a0}"
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2224	using `b0 : B` `R a0 b0` by(blast intro: rev_finite_subset)
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2225	}
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2226	with 1 `b0 : B` show ?thesis by blast
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2227	qed
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2228
87bf104920f2 added pigeonhole lemmas nipkow parents: 36637 diff changeset	2229
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2230	subsubsection {* Cardinality of sums *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2231
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2232	lemma card_Plus:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2233	assumes "finite A" and "finite B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2234	shows "card (A <+> B) = card A + card B"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2235	proof -
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2236	have "Inl`A \<inter> Inr`B = {}" by fast
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2237	with assms show ?thesis
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2238	unfolding Plus_def
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2239	by (simp add: card_Un_disjoint card_image)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2240	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2241
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2242	lemma card_Plus_conv_if:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2243	"card (A <+> B) = (if finite A \<and> finite B then card A + card B else 0)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2244	by (auto simp add: card_Plus)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2245
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2246
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2247	subsubsection {* Cardinality of the Powerset *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2248
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2249	lemma card_Pow: "finite A ==> card (Pow A) = Suc (Suc 0) ^ card A" (* FIXME numeral 2 (!?) *)
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2250	apply (induct rule: finite_induct)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2251	apply (simp_all add: Pow_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2252	apply (subst card_Un_disjoint, blast)
40786 0a54cfc9add3 gave more standard finite set rules simp and intro attribute nipkow parents: 40716 diff changeset	2253	apply (blast, blast)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2254	apply (subgoal_tac "inj_on (insert x) (Pow F)")
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2255	apply (simp add: card_image Pow_insert)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2256	apply (unfold inj_on_def)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2257	apply (blast elim!: equalityE)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2258	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2259
41987 4ad8f1dc2e0b added lemmas nipkow parents: 41657 diff changeset	2260	text {* Relates to equivalence classes. Based on a theorem of F. Kamm\"uller. *}
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2261
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2262	lemma dvd_partition:
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2263	"finite (Union C) ==>
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2264	ALL c : C. k dvd card c ==>
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2265	(ALL c1: C. ALL c2: C. c1 \<noteq> c2 --> c1 Int c2 = {}) ==>
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2266	k dvd card (Union C)"
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2267	apply (frule finite_UnionD)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2268	apply (rotate_tac -1)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2269	apply (induct rule: finite_induct)
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2270	apply simp_all
011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2271	apply clarify
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2272	apply (subst card_Un_disjoint)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2273	apply (auto simp add: disjoint_eq_subset_Compl)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2274	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2275
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2276
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2277	subsubsection {* Relating injectivity and surjectivity *}
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2278
41656 011fcb70e32f restructured theory; haftmann parents: 41550 diff changeset	2279	lemma finite_surj_inj: "finite A \<Longrightarrow> A \<subseteq> f ` A \<Longrightarrow> inj_on f A"
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2280	apply(rule eq_card_imp_inj_on, assumption)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2281	apply(frule finite_imageI)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2282	apply(drule (1) card_seteq)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2283	apply(erule card_image_le)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2284	apply simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2285	done
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2286
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2287	lemma finite_UNIV_surj_inj: fixes f :: "'a \<Rightarrow> 'a"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2288	shows "finite(UNIV:: 'a set) \<Longrightarrow> surj f \<Longrightarrow> inj f"
40702 cf26dd7395e4 Replace surj by abbreviation; remove surj_on. hoelzl parents: 40311 diff changeset	2289	by (blast intro: finite_surj_inj subset_UNIV)
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2290
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2291	lemma finite_UNIV_inj_surj: fixes f :: "'a \<Rightarrow> 'a"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2292	shows "finite(UNIV:: 'a set) \<Longrightarrow> inj f \<Longrightarrow> surj f"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2293	by(fastsimp simp:surj_def dest!: endo_inj_surj)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2294
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2295	corollary infinite_UNIV_nat[iff]: "~finite(UNIV::nat set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2296	proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2297	assume "finite(UNIV::nat set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2298	with finite_UNIV_inj_surj[of Suc]
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2299	show False by simp (blast dest: Suc_neq_Zero surjD)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2300	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2301
35828 46cfc4b8112e now use "Named_Thms" for "noatp", and renamed "noatp" to "no_atp" blanchet parents: 35796 diff changeset	2302	(* Often leads to bogus ATP proofs because of reduced type information, hence no_atp *)
46cfc4b8112e now use "Named_Thms" for "noatp", and renamed "noatp" to "no_atp" blanchet parents: 35796 diff changeset	2303	lemma infinite_UNIV_char_0[no_atp]:
35722 69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2304	"\<not> finite (UNIV::'a::semiring_char_0 set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2305	proof
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2306	assume "finite (UNIV::'a set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2307	with subset_UNIV have "finite (range of_nat::'a set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2308	by (rule finite_subset)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2309	moreover have "inj (of_nat::nat \<Rightarrow> 'a)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2310	by (simp add: inj_on_def)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2311	ultimately have "finite (UNIV::nat set)"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2312	by (rule finite_imageD)
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2313	then show "False"
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2314	by simp
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2315	qed
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2316
69419a09a7ff moved cardinality to Finite_Set as far as appropriate; added locales for fold_image haftmann parents: 35719 diff changeset	2317	end

author	nipkow
	Thu, 17 Mar 2011 09:58:13 +0100
changeset 41988	c2583bbb92f5
parent 41987	4ad8f1dc2e0b
child 42206	0920f709610f
permissions	-rw-r--r--