isabelle: src/HOL/Library/Order_Union.thy@5c9819d7713b (annotated)

52184 d6627b50b131 added Ordered_Union popescua parents: diff changeset	1	(* Title: HOL/Library/Order_Union.thy
d6627b50b131 added Ordered_Union popescua parents: diff changeset	2	Author: Andrei Popescu, TU Muenchen
d6627b50b131 added Ordered_Union popescua parents: diff changeset	3
52199 d25fc4c0ff62 merged Well_Order_Extension into Zorn popescua parents: 52191 diff changeset	4	The ordinal-like sum of two orders with disjoint fields
52184 d6627b50b131 added Ordered_Union popescua parents: diff changeset	5	*)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	6
d6627b50b131 added Ordered_Union popescua parents: diff changeset	7	header {* Order Union *}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	8
d6627b50b131 added Ordered_Union popescua parents: diff changeset	9	theory Order_Union
54481 5c9819d7713b compile blanchet parents: 54473 diff changeset	10	imports "~~/src/HOL/Cardinals/Wellfounded_More_FP"
52184 d6627b50b131 added Ordered_Union popescua parents: diff changeset	11	begin
d6627b50b131 added Ordered_Union popescua parents: diff changeset	12
d6627b50b131 added Ordered_Union popescua parents: diff changeset	13	definition Osum :: "'a rel \<Rightarrow> 'a rel \<Rightarrow> 'a rel" (infix "Osum" 60) where
d6627b50b131 added Ordered_Union popescua parents: diff changeset	14	"r Osum r' = r \<union> r' \<union> {(a, a'). a \<in> Field r \<and> a' \<in> Field r'}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	15
52191 636b62eb7e88 more direct notation; wenzelm parents: 52184 diff changeset	16	notation Osum (infix "\<union>o" 60)
52184 d6627b50b131 added Ordered_Union popescua parents: diff changeset	17
d6627b50b131 added Ordered_Union popescua parents: diff changeset	18	lemma Field_Osum: "Field (r \<union>o r') = Field r \<union> Field r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	19	unfolding Osum_def Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	20
d6627b50b131 added Ordered_Union popescua parents: diff changeset	21	lemma Osum_wf:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	22	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	23	WF: "wf r" and WF': "wf r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	24	shows "wf (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	25	unfolding wf_eq_minimal2 unfolding Field_Osum
d6627b50b131 added Ordered_Union popescua parents: diff changeset	26	proof(intro allI impI, elim conjE)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	27	fix A assume : "A \<subseteq> Field r \<union> Field r'" and *: "A \<noteq> {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	28	obtain B where B_def: "B = A Int Field r" by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	29	show "\<exists>a\<in>A. \<forall>a'\<in>A. (a', a) \<notin> r \<union>o r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	30	proof(cases "B = {}")
d6627b50b131 added Ordered_Union popescua parents: diff changeset	31	assume Case1: "B \<noteq> {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	32	hence "B \<noteq> {} \<and> B \<le> Field r" using B_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	33	then obtain a where 1: "a \<in> B" and 2: "\<forall>a1 \<in> B. (a1,a) \<notin> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	34	using WF unfolding wf_eq_minimal2 by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	35	hence 3: "a \<in> Field r \<and> a \<notin> Field r'" using B_def FLD by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	36	(* *)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	37	have "\<forall>a1 \<in> A. (a1,a) \<notin> r Osum r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	38	proof(intro ballI)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	39	fix a1 assume **: "a1 \<in> A"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	40	{assume Case11: "a1 \<in> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	41	hence "(a1,a) \<notin> r" using B_def ** 2 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	42	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	43	have "(a1,a) \<notin> r'" using 3 by (auto simp add: Field_def)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	44	ultimately have "(a1,a) \<notin> r Osum r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	45	using 3 unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	46	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	47	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	48	{assume Case12: "a1 \<notin> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	49	hence "(a1,a) \<notin> r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	50	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	51	have "(a1,a) \<notin> r'" using 3 unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	52	ultimately have "(a1,a) \<notin> r Osum r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	53	using 3 unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	54	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	55	ultimately show "(a1,a) \<notin> r Osum r'" by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	56	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	57	thus ?thesis using 1 B_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	58	next
d6627b50b131 added Ordered_Union popescua parents: diff changeset	59	assume Case2: "B = {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	60	hence 1: "A \<noteq> {} \<and> A \<le> Field r'" using * ** B_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	61	then obtain a' where 2: "a' \<in> A" and 3: "\<forall>a1' \<in> A. (a1',a') \<notin> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	62	using WF' unfolding wf_eq_minimal2 by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	63	hence 4: "a' \<in> Field r' \<and> a' \<notin> Field r" using 1 FLD by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	64	(* *)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	65	have "\<forall>a1' \<in> A. (a1',a') \<notin> r Osum r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	66	proof(unfold Osum_def, auto simp add: 3)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	67	fix a1' assume "(a1', a') \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	68	thus False using 4 unfolding Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	69	next
d6627b50b131 added Ordered_Union popescua parents: diff changeset	70	fix a1' assume "a1' \<in> A" and "a1' \<in> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	71	thus False using Case2 B_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	72	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	73	thus ?thesis using 2 by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	74	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	75	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	76
d6627b50b131 added Ordered_Union popescua parents: diff changeset	77	lemma Osum_Refl:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	78	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	79	REFL: "Refl r" and REFL': "Refl r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	80	shows "Refl (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	81	using assms
d6627b50b131 added Ordered_Union popescua parents: diff changeset	82	unfolding refl_on_def Field_Osum unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	83
d6627b50b131 added Ordered_Union popescua parents: diff changeset	84	lemma Osum_trans:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	85	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	86	TRANS: "trans r" and TRANS': "trans r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	87	shows "trans (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	88	proof(unfold trans_def, auto)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	89	fix x y z assume : "(x, y) \<in> r \<union>o r'" and *: "(y, z) \<in> r \<union>o r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	90	show "(x, z) \<in> r \<union>o r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	91	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	92	{assume Case1: "(x,y) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	93	hence 1: "x \<in> Field r \<and> y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	94	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	95	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	96	{assume Case11: "(y,z) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	97	hence "(x,z) \<in> r" using Case1 TRANS trans_def[of r] by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	98	hence ?thesis unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	99	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	100	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	101	{assume Case12: "(y,z) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	102	hence "y \<in> Field r'" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	103	hence False using FLD 1 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	104	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	105	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	106	{assume Case13: "z \<in> Field r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	107	hence ?thesis using 1 unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	108	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	109	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	110	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	111	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	112	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	113	{assume Case2: "(x,y) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	114	hence 2: "x \<in> Field r' \<and> y \<in> Field r'" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	115	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	116	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	117	{assume Case21: "(y,z) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	118	hence "y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	119	hence False using FLD 2 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	120	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	121	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	122	{assume Case22: "(y,z) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	123	hence "(x,z) \<in> r'" using Case2 TRANS' trans_def[of r'] by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	124	hence ?thesis unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	125	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	126	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	127	{assume Case23: "y \<in> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	128	hence False using FLD 2 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	129	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	130	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	131	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	132	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	133	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	134	{assume Case3: "x \<in> Field r \<and> y \<in> Field r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	135	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	136	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	137	{assume Case31: "(y,z) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	138	hence "y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	139	hence False using FLD Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	140	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	141	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	142	{assume Case32: "(y,z) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	143	hence "z \<in> Field r'" unfolding Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	144	hence ?thesis unfolding Osum_def using Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	145	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	146	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	147	{assume Case33: "y \<in> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	148	hence False using FLD Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	149	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	150	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	151	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	152	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	153	ultimately show ?thesis using * unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	154	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	155	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	156
d6627b50b131 added Ordered_Union popescua parents: diff changeset	157	lemma Osum_Preorder:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	158	"\<lbrakk>Field r Int Field r' = {}; Preorder r; Preorder r'\<rbrakk> \<Longrightarrow> Preorder (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	159	unfolding preorder_on_def using Osum_Refl Osum_trans by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	160
d6627b50b131 added Ordered_Union popescua parents: diff changeset	161	lemma Osum_antisym:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	162	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	163	AN: "antisym r" and AN': "antisym r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	164	shows "antisym (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	165	proof(unfold antisym_def, auto)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	166	fix x y assume : "(x, y) \<in> r \<union>o r'" and *: "(y, x) \<in> r \<union>o r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	167	show "x = y"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	168	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	169	{assume Case1: "(x,y) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	170	hence 1: "x \<in> Field r \<and> y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	171	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	172	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	173	have "(y,x) \<in> r \<Longrightarrow> ?thesis"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	174	using Case1 AN antisym_def[of r] by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	175	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	176	{assume "(y,x) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	177	hence "y \<in> Field r'" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	178	hence False using FLD 1 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	179	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	180	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	181	have "x \<in> Field r' \<Longrightarrow> False" using FLD 1 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	182	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	183	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	184	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	185	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	186	{assume Case2: "(x,y) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	187	hence 2: "x \<in> Field r' \<and> y \<in> Field r'" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	188	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	189	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	190	{assume "(y,x) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	191	hence "y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	192	hence False using FLD 2 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	193	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	194	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	195	have "(y,x) \<in> r' \<Longrightarrow> ?thesis"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	196	using Case2 AN' antisym_def[of r'] by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	197	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	198	{assume "y \<in> Field r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	199	hence False using FLD 2 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	200	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	201	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	202	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	203	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	204	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	205	{assume Case3: "x \<in> Field r \<and> y \<in> Field r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	206	have ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	207	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	208	{assume "(y,x) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	209	hence "y \<in> Field r" unfolding Field_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	210	hence False using FLD Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	211	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	212	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	213	{assume Case32: "(y,x) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	214	hence "x \<in> Field r'" unfolding Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	215	hence False using FLD Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	216	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	217	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	218	have "\<not> y \<in> Field r" using FLD Case3 by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	219	ultimately show ?thesis using ** unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	220	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	221	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	222	ultimately show ?thesis using * unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	223	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	224	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	225
d6627b50b131 added Ordered_Union popescua parents: diff changeset	226	lemma Osum_Partial_order:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	227	"\<lbrakk>Field r Int Field r' = {}; Partial_order r; Partial_order r'\<rbrakk> \<Longrightarrow>
d6627b50b131 added Ordered_Union popescua parents: diff changeset	228	Partial_order (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	229	unfolding partial_order_on_def using Osum_Preorder Osum_antisym by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	230
d6627b50b131 added Ordered_Union popescua parents: diff changeset	231	lemma Osum_Total:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	232	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	233	TOT: "Total r" and TOT': "Total r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	234	shows "Total (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	235	using assms
d6627b50b131 added Ordered_Union popescua parents: diff changeset	236	unfolding total_on_def Field_Osum unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	237
d6627b50b131 added Ordered_Union popescua parents: diff changeset	238	lemma Osum_Linear_order:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	239	"\<lbrakk>Field r Int Field r' = {}; Linear_order r; Linear_order r'\<rbrakk> \<Longrightarrow>
d6627b50b131 added Ordered_Union popescua parents: diff changeset	240	Linear_order (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	241	unfolding linear_order_on_def using Osum_Partial_order Osum_Total by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	242
d6627b50b131 added Ordered_Union popescua parents: diff changeset	243	lemma Osum_minus_Id1:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	244	assumes "r \<le> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	245	shows "(r Osum r') - Id \<le> (r' - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	246	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	247	let ?Left = "(r Osum r') - Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	248	let ?Right = "(r' - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	249	{fix a::'a and b assume *: "(a,b) \<notin> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	250	{assume "(a,b) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	251	with * have False using assms by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	252	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	253	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	254	{assume "(a,b) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	255	with * have "(a,b) \<in> r' - Id" by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	256	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	257	ultimately
d6627b50b131 added Ordered_Union popescua parents: diff changeset	258	have "(a,b) \<in> ?Left \<Longrightarrow> (a,b) \<in> ?Right"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	259	unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	260	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	261	thus ?thesis by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	262	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	263
d6627b50b131 added Ordered_Union popescua parents: diff changeset	264	lemma Osum_minus_Id2:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	265	assumes "r' \<le> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	266	shows "(r Osum r') - Id \<le> (r - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	267	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	268	let ?Left = "(r Osum r') - Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	269	let ?Right = "(r - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	270	{fix a::'a and b assume *: "(a,b) \<notin> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	271	{assume "(a,b) \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	272	with * have False using assms by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	273	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	274	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	275	{assume "(a,b) \<in> r"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	276	with * have "(a,b) \<in> r - Id" by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	277	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	278	ultimately
d6627b50b131 added Ordered_Union popescua parents: diff changeset	279	have "(a,b) \<in> ?Left \<Longrightarrow> (a,b) \<in> ?Right"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	280	unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	281	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	282	thus ?thesis by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	283	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	284
d6627b50b131 added Ordered_Union popescua parents: diff changeset	285	lemma Osum_minus_Id:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	286	assumes TOT: "Total r" and TOT': "Total r'" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	287	NID: "\<not> (r \<le> Id)" and NID': "\<not> (r' \<le> Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	288	shows "(r Osum r') - Id \<le> (r - Id) Osum (r' - Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	289	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	290	{fix a a' assume : "(a,a') \<in> (r Osum r')" and *: "a \<noteq> a'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	291	have "(a,a') \<in> (r - Id) Osum (r' - Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	292	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	293	{assume "(a,a') \<in> r \<or> (a,a') \<in> r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	294	with ** have ?thesis unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	295	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	296	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	297	{assume "a \<in> Field r \<and> a' \<in> Field r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	298	hence "a \<in> Field(r - Id) \<and> a' \<in> Field (r' - Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	299	using assms Total_Id_Field by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	300	hence ?thesis unfolding Osum_def by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	301	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	302	ultimately show ?thesis using * unfolding Osum_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	303	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	304	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	305	thus ?thesis by(auto simp add: Osum_def)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	306	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	307
d6627b50b131 added Ordered_Union popescua parents: diff changeset	308	lemma wf_Int_Times:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	309	assumes "A Int B = {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	310	shows "wf(A \<times> B)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	311	proof(unfold wf_def, auto)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	312	fix P x
d6627b50b131 added Ordered_Union popescua parents: diff changeset	313	assume *: "\<forall>x. (\<forall>y. y \<in> A \<and> x \<in> B \<longrightarrow> P y) \<longrightarrow> P x"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	314	moreover have "\<forall>y \<in> A. P y" using assms * by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	315	ultimately show "P x" using * by (case_tac "x \<in> B", auto)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	316	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	317
d6627b50b131 added Ordered_Union popescua parents: diff changeset	318	lemma Osum_wf_Id:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	319	assumes TOT: "Total r" and TOT': "Total r'" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	320	FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	321	WF: "wf(r - Id)" and WF': "wf(r' - Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	322	shows "wf ((r Osum r') - Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	323	proof(cases "r \<le> Id \<or> r' \<le> Id")
d6627b50b131 added Ordered_Union popescua parents: diff changeset	324	assume Case1: "\<not>(r \<le> Id \<or> r' \<le> Id)"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	325	have "Field(r - Id) Int Field(r' - Id) = {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	326	using FLD mono_Field[of "r - Id" r] mono_Field[of "r' - Id" r']
d6627b50b131 added Ordered_Union popescua parents: diff changeset	327	Diff_subset[of r Id] Diff_subset[of r' Id] by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	328	thus ?thesis
d6627b50b131 added Ordered_Union popescua parents: diff changeset	329	using Case1 Osum_minus_Id[of r r'] assms Osum_wf[of "r - Id" "r' - Id"]
d6627b50b131 added Ordered_Union popescua parents: diff changeset	330	wf_subset[of "(r - Id) \<union>o (r' - Id)" "(r Osum r') - Id"] by auto
d6627b50b131 added Ordered_Union popescua parents: diff changeset	331	next
d6627b50b131 added Ordered_Union popescua parents: diff changeset	332	have 1: "wf(Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	333	using FLD by (auto simp add: wf_Int_Times)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	334	assume Case2: "r \<le> Id \<or> r' \<le> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	335	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	336	{assume Case21: "r \<le> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	337	hence "(r Osum r') - Id \<le> (r' - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	338	using Osum_minus_Id1[of r r'] by simp
d6627b50b131 added Ordered_Union popescua parents: diff changeset	339	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	340	{have "Domain(Field r \<times> Field r') Int Range(r' - Id) = {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	341	using FLD unfolding Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	342	hence "wf((r' - Id) \<union> (Field r \<times> Field r'))"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	343	using 1 WF' wf_Un[of "Field r \<times> Field r'" "r' - Id"]
d6627b50b131 added Ordered_Union popescua parents: diff changeset	344	by (auto simp add: Un_commute)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	345	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	346	ultimately have ?thesis by (auto simp add: wf_subset)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	347	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	348	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	349	{assume Case22: "r' \<le> Id"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	350	hence "(r Osum r') - Id \<le> (r - Id) \<union> (Field r \<times> Field r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	351	using Osum_minus_Id2[of r' r] by simp
d6627b50b131 added Ordered_Union popescua parents: diff changeset	352	moreover
d6627b50b131 added Ordered_Union popescua parents: diff changeset	353	{have "Range(Field r \<times> Field r') Int Domain(r - Id) = {}"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	354	using FLD unfolding Field_def by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	355	hence "wf((r - Id) \<union> (Field r \<times> Field r'))"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	356	using 1 WF wf_Un[of "r - Id" "Field r \<times> Field r'"]
d6627b50b131 added Ordered_Union popescua parents: diff changeset	357	by (auto simp add: Un_commute)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	358	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	359	ultimately have ?thesis by (auto simp add: wf_subset)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	360	}
d6627b50b131 added Ordered_Union popescua parents: diff changeset	361	ultimately show ?thesis by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	362	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	363
d6627b50b131 added Ordered_Union popescua parents: diff changeset	364	lemma Osum_Well_order:
d6627b50b131 added Ordered_Union popescua parents: diff changeset	365	assumes FLD: "Field r Int Field r' = {}" and
d6627b50b131 added Ordered_Union popescua parents: diff changeset	366	WELL: "Well_order r" and WELL': "Well_order r'"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	367	shows "Well_order (r Osum r')"
d6627b50b131 added Ordered_Union popescua parents: diff changeset	368	proof-
d6627b50b131 added Ordered_Union popescua parents: diff changeset	369	have "Total r \<and> Total r'" using WELL WELL'
d6627b50b131 added Ordered_Union popescua parents: diff changeset	370	by (auto simp add: order_on_defs)
d6627b50b131 added Ordered_Union popescua parents: diff changeset	371	thus ?thesis using assms unfolding well_order_on_def
d6627b50b131 added Ordered_Union popescua parents: diff changeset	372	using Osum_Linear_order Osum_wf_Id by blast
d6627b50b131 added Ordered_Union popescua parents: diff changeset	373	qed
d6627b50b131 added Ordered_Union popescua parents: diff changeset	374
d6627b50b131 added Ordered_Union popescua parents: diff changeset	375	end
d6627b50b131 added Ordered_Union popescua parents: diff changeset	376

author	blanchet
	Mon, 18 Nov 2013 18:04:45 +0100
changeset 54481	5c9819d7713b
parent 54473	8bee5ca99e63
child 54482	a2874c8b3558
permissions	-rw-r--r--