isabelle: src/HOL/ZF/LProd.thy@c40ce2de2020 (annotated)

19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	1	(* Title: HOL/ZF/LProd.thy
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	2	ID: $Id$
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	3	Author: Steven Obua
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	4
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	5	Introduces the lprod relation.
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	6	See "Partizan Games in Isabelle/HOLZF", available from http://www4.in.tum.de/~obua/partizan
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	7	*)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	8
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	9	theory LProd
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	10	imports Multiset
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	11	begin
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	12
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	13	consts
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	14	lprod :: "('a * 'a) set \<Rightarrow> ('a list * 'a list) set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	15
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	16	inductive "lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	17	intros
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	18	lprod_single[intro!]: "(a, b) \<in> R \<Longrightarrow> ([a], [b]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	19	lprod_list[intro!]: "(ah@at, bh@bt) \<in> lprod R \<Longrightarrow> (a,b) \<in> R \<or> a = b \<Longrightarrow> (ah@a#at, bh@b#bt) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	20
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	21	lemma "(as,bs) \<in> lprod R \<Longrightarrow> length as = length bs"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	22	apply (induct as bs rule: lprod.induct)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	23	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	24	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	25
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	26	lemma "(as, bs) \<in> lprod R \<Longrightarrow> 1 \<le> length as \<and> 1 \<le> length bs"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	27	apply (induct as bs rule: lprod.induct)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	28	apply auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	29	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	30
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	31	lemma lprod_subset_elem: "(as, bs) \<in> lprod S \<Longrightarrow> S \<subseteq> R \<Longrightarrow> (as, bs) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	32	apply (induct as bs rule: lprod.induct)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	33	apply (auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	34	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	35
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	36	lemma lprod_subset: "S \<subseteq> R \<Longrightarrow> lprod S \<subseteq> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	37	by (auto intro: lprod_subset_elem)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	38
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	39	lemma lprod_implies_mult: "(as, bs) \<in> lprod R \<Longrightarrow> trans R \<Longrightarrow> (multiset_of as, multiset_of bs) \<in> mult R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	40	proof (induct as bs rule: lprod.induct)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	41	case (lprod_single a b)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	42	note step = one_step_implies_mult[
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	43	where r=R and I="{#}" and K="{#a#}" and J="{#b#}", simplified]
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	44	show ?case by (auto intro: lprod_single step)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	45	next
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	46	case (lprod_list a ah at b bh bt)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	47	from prems have transR: "trans R" by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	48	have as: "multiset_of (ah @ a # at) = multiset_of (ah @ at) + {#a#}" (is "_ = ?ma + _")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	49	by (simp add: ring_eq_simps)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	50	have bs: "multiset_of (bh @ b # bt) = multiset_of (bh @ bt) + {#b#}" (is "_ = ?mb + _")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	51	by (simp add: ring_eq_simps)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	52	from prems have "(?ma, ?mb) \<in> mult R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	53	by auto
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	54	with mult_implies_one_step[OF transR] have
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	55	"\<exists>I J K. ?mb = I + J \<and> ?ma = I + K \<and> J \<noteq> {#} \<and> (\<forall>k\<in>set_of K. \<exists>j\<in>set_of J. (k, j) \<in> R)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	56	by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	57	then obtain I J K where
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	58	decomposed: "?mb = I + J \<and> ?ma = I + K \<and> J \<noteq> {#} \<and> (\<forall>k\<in>set_of K. \<exists>j\<in>set_of J. (k, j) \<in> R)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	59	by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	60	show ?case
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	61	proof (cases "a = b")
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	62	case True
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	63	have "((I + {#b#}) + K, (I + {#b#}) + J) \<in> mult R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	64	apply (rule one_step_implies_mult[OF transR])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	65	apply (auto simp add: decomposed)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	66	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	67	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	68	apply (simp only: as bs)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	69	apply (simp only: decomposed True)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	70	apply (simp add: ring_eq_simps)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	71	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	72	next
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	73	case False
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	74	from False lprod_list have False: "(a, b) \<in> R" by blast
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	75	have "(I + (K + {#a#}), I + (J + {#b#})) \<in> mult R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	76	apply (rule one_step_implies_mult[OF transR])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	77	apply (auto simp add: False decomposed)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	78	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	79	then show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	80	apply (simp only: as bs)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	81	apply (simp only: decomposed)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	82	apply (simp add: ring_eq_simps)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	83	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	84	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	85	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	86
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	87	lemma wf_lprod[recdef_wf,simp,intro]:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	88	assumes wf_R: "wf R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	89	shows "wf (lprod R)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	90	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	91	have subset: "lprod (R^+) \<subseteq> inv_image (mult (R^+)) multiset_of"
19769 c40ce2de2020 Added [simp]-lemmas "in_inv_image" and "in_lex_prod" in the spirit of "in_measure". krauss parents: 19203 diff changeset	92	by (auto simp add: lprod_implies_mult trans_trancl)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	93	note lprodtrancl = wf_subset[OF wf_inv_image[where r="mult (R^+)" and f="multiset_of",
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	94	OF wf_mult[OF wf_trancl[OF wf_R]]], OF subset]
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	95	note lprod = wf_subset[OF lprodtrancl, where p="lprod R", OF lprod_subset, simplified]
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	96	show ?thesis by (auto intro: lprod)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	97	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	98
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	99	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	100	gprod_2_2 :: "('a * 'a) set \<Rightarrow> (('a * 'a) * ('a * 'a)) set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	101	"gprod_2_2 R \<equiv> { ((a,b), (c,d)) . (a = c \<and> (b,d) \<in> R) \<or> (b = d \<and> (a,c) \<in> R) }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	102	gprod_2_1 :: "('a * 'a) set \<Rightarrow> (('a * 'a) * ('a * 'a)) set"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	103	"gprod_2_1 R \<equiv> { ((a,b), (c,d)) . (a = d \<and> (b,c) \<in> R) \<or> (b = c \<and> (a,d) \<in> R) }"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	104
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	105	lemma lprod_2_3: "(a, b) \<in> R \<Longrightarrow> ([a, c], [b, c]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	106	by (auto intro: lprod_list[where a=c and b=c and
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	107	ah = "[a]" and at = "[]" and bh="[b]" and bt="[]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	108
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	109	lemma lprod_2_4: "(a, b) \<in> R \<Longrightarrow> ([c, a], [c, b]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	110	by (auto intro: lprod_list[where a=c and b=c and
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	111	ah = "[]" and at = "[a]" and bh="[]" and bt="[b]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	112
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	113	lemma lprod_2_1: "(a, b) \<in> R \<Longrightarrow> ([c, a], [b, c]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	114	by (auto intro: lprod_list[where a=c and b=c and
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	115	ah = "[]" and at = "[a]" and bh="[b]" and bt="[]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	116
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	117	lemma lprod_2_2: "(a, b) \<in> R \<Longrightarrow> ([a, c], [c, b]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	118	by (auto intro: lprod_list[where a=c and b=c and
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	119	ah = "[a]" and at = "[]" and bh="[]" and bt="[b]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	120
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	121	lemma [recdef_wf, simp, intro]:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	122	assumes wfR: "wf R" shows "wf (gprod_2_1 R)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	123	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	124	have "gprod_2_1 R \<subseteq> inv_image (lprod R) (\<lambda> (a,b). [a,b])"
19769 c40ce2de2020 Added [simp]-lemmas "in_inv_image" and "in_lex_prod" in the spirit of "in_measure". krauss parents: 19203 diff changeset	125	by (auto simp add: gprod_2_1_def lprod_2_1 lprod_2_2)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	126	with wfR show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	127	by (rule_tac wf_subset, auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	128	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	129
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	130	lemma [recdef_wf, simp, intro]:
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	131	assumes wfR: "wf R" shows "wf (gprod_2_2 R)"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	132	proof -
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	133	have "gprod_2_2 R \<subseteq> inv_image (lprod R) (\<lambda> (a,b). [a,b])"
19769 c40ce2de2020 Added [simp]-lemmas "in_inv_image" and "in_lex_prod" in the spirit of "in_measure". krauss parents: 19203 diff changeset	134	by (auto simp add: gprod_2_2_def lprod_2_3 lprod_2_4)
19203 778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	135	with wfR show ?thesis
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	136	by (rule_tac wf_subset, auto)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	137	qed
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	138
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	139	lemma lprod_3_1: assumes "(x', x) \<in> R" shows "([y, z, x'], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	140	apply (rule lprod_list[where a="y" and b="y" and ah="[]" and at="[z,x']" and bh="[x]" and bt="[z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	141	apply (auto simp add: lprod_2_1 prems)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	142	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	143
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	144	lemma lprod_3_2: assumes "(z',z) \<in> R" shows "([z', x, y], [x,y,z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	145	apply (rule lprod_list[where a="y" and b="y" and ah="[z',x]" and at="[]" and bh="[x]" and bt="[z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	146	apply (auto simp add: lprod_2_2 prems)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	147	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	148
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	149	lemma lprod_3_3: assumes xr: "(xr, x) \<in> R" shows "([xr, y, z], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	150	apply (rule lprod_list[where a="y" and b="y" and ah="[xr]" and at="[z]" and bh="[x]" and bt="[z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	151	apply (simp add: xr lprod_2_3)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	152	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	153
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	154	lemma lprod_3_4: assumes yr: "(yr, y) \<in> R" shows "([x, yr, z], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	155	apply (rule lprod_list[where a="x" and b="x" and ah="[]" and at="[yr,z]" and bh="[]" and bt="[y,z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	156	apply (simp add: yr lprod_2_3)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	157	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	158
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	159	lemma lprod_3_5: assumes zr: "(zr, z) \<in> R" shows "([x, y, zr], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	160	apply (rule lprod_list[where a="x" and b="x" and ah="[]" and at="[y,zr]" and bh="[]" and bt="[y,z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	161	apply (simp add: zr lprod_2_4)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	162	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	163
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	164	lemma lprod_3_6: assumes y': "(y', y) \<in> R" shows "([x, z, y'], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	165	apply (rule lprod_list[where a="z" and b="z" and ah="[x]" and at="[y']" and bh="[x,y]" and bt="[]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	166	apply (simp add: y' lprod_2_4)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	167	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	168
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	169	lemma lprod_3_7: assumes z': "(z',z) \<in> R" shows "([x, z', y], [x, y, z]) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	170	apply (rule lprod_list[where a="y" and b="y" and ah="[x, z']" and at="[]" and bh="[x]" and bt="[z]", simplified])
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	171	apply (simp add: z' lprod_2_4)
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	172	done
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	173
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	174	constdefs
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	175	perm :: "('a \<Rightarrow> 'a) \<Rightarrow> 'a set \<Rightarrow> bool"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	176	"perm f A \<equiv> inj_on f A \<and> f ` A = A"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	177
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	178	lemma "((as,bs) \<in> lprod R) =
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	179	(\<exists> f. perm f {0 ..< (length as)} \<and>
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	180	(\<forall> j. j < length as \<longrightarrow> ((nth as j, nth bs (f j)) \<in> R \<or> (nth as j = nth bs (f j)))) \<and>
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	181	(\<exists> i. i < length as \<and> (nth as i, nth bs (f i)) \<in> R))"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	182	oops
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	183
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	184	lemma "trans R \<Longrightarrow> (ah@a#at, bh@b#bt) \<in> lprod R \<Longrightarrow> (b, a) \<in> R \<or> a = b \<Longrightarrow> (ah@at, bh@bt) \<in> lprod R"
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	185	oops
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	186
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	187
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	188
778507520684 Added HOL-ZF to Isabelle. obua parents: diff changeset	189	end

author	krauss
	Mon, 05 Jun 2006 14:22:58 +0200
changeset 19769	c40ce2de2020
parent 19203	778507520684
child 22282	71b4aefad227
permissions	-rw-r--r--