isabelle: src/HOL/Nominal/Nominal.thy@b4a0da62126e (annotated)

17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1	(* $Id$ *)
c35381811d5c Initial revision. berghofe parents: diff changeset	2
19494 2e909d5309f4 Renamed "nominal" theory to "Nominal". berghofe parents: 19477 diff changeset	3	theory Nominal
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	4	imports Main
18068 e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	5	uses
e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	6	("nominal_atoms.ML")
e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	7	("nominal_package.ML")
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	8	("nominal_induct.ML")
18068 e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	9	("nominal_permeq.ML")
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	10	begin
c35381811d5c Initial revision. berghofe parents: diff changeset	11
19751 3006498da5c5 added the hack "reset NameSpace.unique_names" to Nominal.thy urbanc parents: 19687 diff changeset	12	(* FIXME: this needs to be corrected in nominal_package *)
3006498da5c5 added the hack "reset NameSpace.unique_names" to Nominal.thy urbanc parents: 19687 diff changeset	13	ML {* reset NameSpace.unique_names; *}
3006498da5c5 added the hack "reset NameSpace.unique_names" to Nominal.thy urbanc parents: 19687 diff changeset	14
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	15	section {* Permutations *}
c35381811d5c Initial revision. berghofe parents: diff changeset	16	(======================)
c35381811d5c Initial revision. berghofe parents: diff changeset	17
c35381811d5c Initial revision. berghofe parents: diff changeset	18	types
c35381811d5c Initial revision. berghofe parents: diff changeset	19	'x prm = "('x \<times> 'x) list"
c35381811d5c Initial revision. berghofe parents: diff changeset	20
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	21	(* polymorphic operations for permutation and swapping *)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	22	consts
18491 1ce410ff9941 Tuned syntax for perm. berghofe parents: 18431 diff changeset	23	perm :: "'x prm \<Rightarrow> 'a \<Rightarrow> 'a" (infixr "\<bullet>" 80)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	24	swap :: "('x \<times> 'x) \<Rightarrow> 'x \<Rightarrow> 'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	25
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	26	(* for the decision procedure involving permutations *)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	27	(* (to make the perm-composition to be terminating *)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	28	constdefs
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	29	"perm_aux pi x \<equiv> pi\<bullet>x"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	30
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	31	(* permutation on sets *)
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	32	defs (unchecked overloaded)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	33	perm_set_def: "pi\<bullet>(X::'a set) \<equiv> {pi\<bullet>a \| a. a\<in>X}"
c35381811d5c Initial revision. berghofe parents: diff changeset	34
18656 32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	35	lemma perm_empty:
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	36	shows "pi\<bullet>{} = {}"
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	37	by (simp add: perm_set_def)
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	38
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	39	lemma perm_union:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	40	shows "pi \<bullet> (X \<union> Y) = (pi \<bullet> X) \<union> (pi \<bullet> Y)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	41	by (auto simp add: perm_set_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	42
18656 32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	43	lemma perm_insert:
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	44	shows "pi\<bullet>(insert x X) = insert (pi\<bullet>x) (pi\<bullet>X)"
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	45	by (auto simp add: perm_set_def)
32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	46
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	47	(* permutation on units and products *)
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	48	primrec (unchecked perm_unit)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	49	"pi\<bullet>() = ()"
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	50
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	51	primrec (unchecked perm_prod)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	52	"pi\<bullet>(a,b) = (pi\<bullet>a,pi\<bullet>b)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	53
c35381811d5c Initial revision. berghofe parents: diff changeset	54	lemma perm_fst:
c35381811d5c Initial revision. berghofe parents: diff changeset	55	"pi\<bullet>(fst x) = fst (pi\<bullet>x)"
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	56	by (cases x) simp
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	57
c35381811d5c Initial revision. berghofe parents: diff changeset	58	lemma perm_snd:
c35381811d5c Initial revision. berghofe parents: diff changeset	59	"pi\<bullet>(snd x) = snd (pi\<bullet>x)"
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	60	by (cases x) simp
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	61
c35381811d5c Initial revision. berghofe parents: diff changeset	62	(* permutation on lists *)
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	63	primrec (unchecked perm_list)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	64	perm_nil_def: "pi\<bullet>[] = []"
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	65	perm_cons_def: "pi\<bullet>(x#xs) = (pi\<bullet>x)#(pi\<bullet>xs)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	66
c35381811d5c Initial revision. berghofe parents: diff changeset	67	lemma perm_append:
c35381811d5c Initial revision. berghofe parents: diff changeset	68	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	69	and l1 :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	70	and l2 :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	71	shows "pi\<bullet>(l1@l2) = (pi\<bullet>l1)@(pi\<bullet>l2)"
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	72	by (induct l1) auto
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	73
c35381811d5c Initial revision. berghofe parents: diff changeset	74	lemma perm_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	75	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	76	and l :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	77	shows "pi\<bullet>(rev l) = rev (pi\<bullet>l)"
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	78	by (induct l) (simp_all add: perm_append)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	79
c35381811d5c Initial revision. berghofe parents: diff changeset	80	(* permutation on functions *)
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	81	defs (unchecked overloaded)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	82	perm_fun_def: "pi\<bullet>(f::'a\<Rightarrow>'b) \<equiv> (\<lambda>x. pi\<bullet>f((rev pi)\<bullet>x))"
c35381811d5c Initial revision. berghofe parents: diff changeset	83
c35381811d5c Initial revision. berghofe parents: diff changeset	84	(* permutation on bools *)
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	85	primrec (unchecked perm_bool)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	86	perm_true_def: "pi\<bullet>True = True"
c35381811d5c Initial revision. berghofe parents: diff changeset	87	perm_false_def: "pi\<bullet>False = False"
c35381811d5c Initial revision. berghofe parents: diff changeset	88
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	89	lemma perm_bool:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	90	shows "pi\<bullet>(b::bool) = b"
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	91	by (cases b) auto
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	92
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	93	(* permutation on options *)
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	94	primrec (unchecked perm_option)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	95	perm_some_def: "pi\<bullet>Some(x) = Some(pi\<bullet>x)"
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	96	perm_none_def: "pi\<bullet>None = None"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	97
c35381811d5c Initial revision. berghofe parents: diff changeset	98	(* a "private" copy of the option type used in the abstraction function *)
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	99	datatype 'a noption = nSome 'a \| nNone
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	100
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	101	primrec (unchecked perm_noption)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	102	perm_nSome_def: "pi\<bullet>nSome(x) = nSome(pi\<bullet>x)"
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	103	perm_nNone_def: "pi\<bullet>nNone = nNone"
18600 20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	104
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	105	(* a "private" copy of the product type used in the nominal induct method *)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	106	datatype ('a,'b) nprod = nPair 'a 'b
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	107
19687 0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	108	primrec (unchecked perm_nprod)
0a7c6d78ad6b primrec (unchecked); wenzelm parents: 19638 diff changeset	109	perm_nProd_def: "pi\<bullet>(nPair x1 x2) = nPair (pi\<bullet>x1) (pi\<bullet>x2)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	110
c35381811d5c Initial revision. berghofe parents: diff changeset	111	(* permutation on characters (used in strings) *)
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	112	defs (unchecked overloaded)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	113	perm_char_def: "pi\<bullet>(s::char) \<equiv> s"
c35381811d5c Initial revision. berghofe parents: diff changeset	114
c35381811d5c Initial revision. berghofe parents: diff changeset	115	(* permutation on ints *)
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	116	defs (unchecked overloaded)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	117	perm_int_def: "pi\<bullet>(i::int) \<equiv> i"
c35381811d5c Initial revision. berghofe parents: diff changeset	118
c35381811d5c Initial revision. berghofe parents: diff changeset	119	(* permutation on nats *)
19634 c78cf8981c5d defs (unchecked overloaded), including former primrec; wenzelm parents: 19566 diff changeset	120	defs (unchecked overloaded)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	121	perm_nat_def: "pi\<bullet>(i::nat) \<equiv> i"
c35381811d5c Initial revision. berghofe parents: diff changeset	122
c35381811d5c Initial revision. berghofe parents: diff changeset	123	section {* permutation equality *}
c35381811d5c Initial revision. berghofe parents: diff changeset	124	(==============================)
c35381811d5c Initial revision. berghofe parents: diff changeset	125
c35381811d5c Initial revision. berghofe parents: diff changeset	126	constdefs
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	127	prm_eq :: "'x prm \<Rightarrow> 'x prm \<Rightarrow> bool" (" _ \<triangleq> _ " [80,80] 80)
dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	128	"pi1 \<triangleq> pi2 \<equiv> \<forall>a::'x. pi1\<bullet>a = pi2\<bullet>a"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	129
c35381811d5c Initial revision. berghofe parents: diff changeset	130	section {* Support, Freshness and Supports*}
c35381811d5c Initial revision. berghofe parents: diff changeset	131	(========================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	132	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	133	supp :: "'a \<Rightarrow> ('x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	134	"supp x \<equiv> {a . (infinite {b . [(a,b)]\<bullet>x \<noteq> x})}"
c35381811d5c Initial revision. berghofe parents: diff changeset	135
17871 67ffbfcd6fef deleted leading space in the definition of fresh urbanc parents: 17870 diff changeset	136	fresh :: "'x \<Rightarrow> 'a \<Rightarrow> bool" ("_ \<sharp> _" [80,80] 80)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	137	"a \<sharp> x \<equiv> a \<notin> supp x"
c35381811d5c Initial revision. berghofe parents: diff changeset	138
c35381811d5c Initial revision. berghofe parents: diff changeset	139	supports :: "'x set \<Rightarrow> 'a \<Rightarrow> bool" (infixl 80)
c35381811d5c Initial revision. berghofe parents: diff changeset	140	"S supports x \<equiv> \<forall>a b. (a\<notin>S \<and> b\<notin>S \<longrightarrow> [(a,b)]\<bullet>x=x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	141
c35381811d5c Initial revision. berghofe parents: diff changeset	142	lemma supp_fresh_iff:
c35381811d5c Initial revision. berghofe parents: diff changeset	143	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	144	shows "(supp x) = {a::'x. \<not>a\<sharp>x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	145	apply(simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	146	done
c35381811d5c Initial revision. berghofe parents: diff changeset	147
c35381811d5c Initial revision. berghofe parents: diff changeset	148	lemma supp_unit:
c35381811d5c Initial revision. berghofe parents: diff changeset	149	shows "supp () = {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	150	by (simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	151
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	152	lemma supp_set_empty:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	153	shows "supp {} = {}"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	154	by (force simp add: supp_def perm_set_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	155
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	156	lemma supp_singleton:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	157	shows "supp {x} = supp x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	158	by (force simp add: supp_def perm_set_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	159
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	160	lemma supp_prod:
c35381811d5c Initial revision. berghofe parents: diff changeset	161	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	162	and y :: "'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	163	shows "(supp (x,y)) = (supp x)\<union>(supp y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	164	by (force simp add: supp_def Collect_imp_eq Collect_neg_eq)
c35381811d5c Initial revision. berghofe parents: diff changeset	165
18600 20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	166	lemma supp_nprod:
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	167	fixes x :: "'a"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	168	and y :: "'b"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	169	shows "(supp (nPair x y)) = (supp x)\<union>(supp y)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	170	by (force simp add: supp_def Collect_imp_eq Collect_neg_eq)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	171
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	172	lemma supp_list_nil:
c35381811d5c Initial revision. berghofe parents: diff changeset	173	shows "supp [] = {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	174	apply(simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	175	done
c35381811d5c Initial revision. berghofe parents: diff changeset	176
c35381811d5c Initial revision. berghofe parents: diff changeset	177	lemma supp_list_cons:
c35381811d5c Initial revision. berghofe parents: diff changeset	178	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	179	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	180	shows "supp (x#xs) = (supp x)\<union>(supp xs)"
c35381811d5c Initial revision. berghofe parents: diff changeset	181	apply(auto simp add: supp_def Collect_imp_eq Collect_neg_eq)
c35381811d5c Initial revision. berghofe parents: diff changeset	182	done
c35381811d5c Initial revision. berghofe parents: diff changeset	183
c35381811d5c Initial revision. berghofe parents: diff changeset	184	lemma supp_list_append:
c35381811d5c Initial revision. berghofe parents: diff changeset	185	fixes xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	186	and ys :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	187	shows "supp (xs@ys) = (supp xs)\<union>(supp ys)"
c35381811d5c Initial revision. berghofe parents: diff changeset	188	by (induct xs, auto simp add: supp_list_nil supp_list_cons)
c35381811d5c Initial revision. berghofe parents: diff changeset	189
c35381811d5c Initial revision. berghofe parents: diff changeset	190	lemma supp_list_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	191	fixes xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	192	shows "supp (rev xs) = (supp xs)"
c35381811d5c Initial revision. berghofe parents: diff changeset	193	by (induct xs, auto simp add: supp_list_append supp_list_cons supp_list_nil)
c35381811d5c Initial revision. berghofe parents: diff changeset	194
c35381811d5c Initial revision. berghofe parents: diff changeset	195	lemma supp_bool:
c35381811d5c Initial revision. berghofe parents: diff changeset	196	fixes x :: "bool"
c35381811d5c Initial revision. berghofe parents: diff changeset	197	shows "supp (x) = {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	198	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	199	apply(simp_all add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	200	done
c35381811d5c Initial revision. berghofe parents: diff changeset	201
c35381811d5c Initial revision. berghofe parents: diff changeset	202	lemma supp_some:
c35381811d5c Initial revision. berghofe parents: diff changeset	203	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	204	shows "supp (Some x) = (supp x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	205	apply(simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	206	done
c35381811d5c Initial revision. berghofe parents: diff changeset	207
c35381811d5c Initial revision. berghofe parents: diff changeset	208	lemma supp_none:
c35381811d5c Initial revision. berghofe parents: diff changeset	209	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	210	shows "supp (None) = {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	211	apply(simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	212	done
c35381811d5c Initial revision. berghofe parents: diff changeset	213
c35381811d5c Initial revision. berghofe parents: diff changeset	214	lemma supp_int:
c35381811d5c Initial revision. berghofe parents: diff changeset	215	fixes i::"int"
c35381811d5c Initial revision. berghofe parents: diff changeset	216	shows "supp (i) = {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	217	apply(simp add: supp_def perm_int_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	218	done
c35381811d5c Initial revision. berghofe parents: diff changeset	219
18627 f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	220	lemma supp_char:
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	221	fixes c::"char"
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	222	shows "supp (c) = {}"
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	223	apply(simp add: supp_def perm_char_def)
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	224	done
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	225
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	226	lemma supp_string:
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	227	fixes s::"string"
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	228	shows "supp (s) = {}"
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	229	apply(induct s)
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	230	apply(auto simp add: supp_char supp_list_nil supp_list_cons)
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	231	done
f0acb66858b4 added the lemmas supp_char and supp_string urbanc parents: 18600 diff changeset	232
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	233	lemma fresh_set_empty:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	234	shows "a\<sharp>{}"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	235	by (simp add: fresh_def supp_set_empty)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	236
18578 68420ce82a0b added "fresh_singleton" lemma urbanc parents: 18491 diff changeset	237	lemma fresh_singleton:
68420ce82a0b added "fresh_singleton" lemma urbanc parents: 18491 diff changeset	238	shows "a\<sharp>{x} = a\<sharp>x"
68420ce82a0b added "fresh_singleton" lemma urbanc parents: 18491 diff changeset	239	by (simp add: fresh_def supp_singleton)
68420ce82a0b added "fresh_singleton" lemma urbanc parents: 18491 diff changeset	240
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	241	lemma fresh_prod:
c35381811d5c Initial revision. berghofe parents: diff changeset	242	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	243	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	244	and y :: "'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	245	shows "a\<sharp>(x,y) = (a\<sharp>x \<and> a\<sharp>y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	246	by (simp add: fresh_def supp_prod)
c35381811d5c Initial revision. berghofe parents: diff changeset	247
c35381811d5c Initial revision. berghofe parents: diff changeset	248	lemma fresh_list_nil:
c35381811d5c Initial revision. berghofe parents: diff changeset	249	fixes a :: "'x"
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	250	shows "a\<sharp>[]"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	251	by (simp add: fresh_def supp_list_nil)
c35381811d5c Initial revision. berghofe parents: diff changeset	252
c35381811d5c Initial revision. berghofe parents: diff changeset	253	lemma fresh_list_cons:
c35381811d5c Initial revision. berghofe parents: diff changeset	254	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	255	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	256	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	257	shows "a\<sharp>(x#xs) = (a\<sharp>x \<and> a\<sharp>xs)"
c35381811d5c Initial revision. berghofe parents: diff changeset	258	by (simp add: fresh_def supp_list_cons)
c35381811d5c Initial revision. berghofe parents: diff changeset	259
c35381811d5c Initial revision. berghofe parents: diff changeset	260	lemma fresh_list_append:
c35381811d5c Initial revision. berghofe parents: diff changeset	261	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	262	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	263	and ys :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	264	shows "a\<sharp>(xs@ys) = (a\<sharp>xs \<and> a\<sharp>ys)"
c35381811d5c Initial revision. berghofe parents: diff changeset	265	by (simp add: fresh_def supp_list_append)
c35381811d5c Initial revision. berghofe parents: diff changeset	266
c35381811d5c Initial revision. berghofe parents: diff changeset	267	lemma fresh_list_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	268	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	269	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	270	shows "a\<sharp>(rev xs) = a\<sharp>xs"
c35381811d5c Initial revision. berghofe parents: diff changeset	271	by (simp add: fresh_def supp_list_rev)
c35381811d5c Initial revision. berghofe parents: diff changeset	272
c35381811d5c Initial revision. berghofe parents: diff changeset	273	lemma fresh_none:
c35381811d5c Initial revision. berghofe parents: diff changeset	274	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	275	shows "a\<sharp>None"
c35381811d5c Initial revision. berghofe parents: diff changeset	276	apply(simp add: fresh_def supp_none)
c35381811d5c Initial revision. berghofe parents: diff changeset	277	done
c35381811d5c Initial revision. berghofe parents: diff changeset	278
c35381811d5c Initial revision. berghofe parents: diff changeset	279	lemma fresh_some:
c35381811d5c Initial revision. berghofe parents: diff changeset	280	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	281	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	282	shows "a\<sharp>(Some x) = a\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	283	apply(simp add: fresh_def supp_some)
c35381811d5c Initial revision. berghofe parents: diff changeset	284	done
c35381811d5c Initial revision. berghofe parents: diff changeset	285
18294 bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	286	text {* Normalization of freshness results; cf.\ @{text nominal_induct} *}
bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	287
18656 32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	288	lemma fresh_unit_elim: "(a\<sharp>() \<Longrightarrow> PROP C) \<equiv> PROP C"
18294 bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	289	by (simp add: fresh_def supp_unit)
bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	290
18656 32722023ff90 added lemmas perm_empty, perm_insert to do with urbanc parents: 18627 diff changeset	291	lemma fresh_prod_elim: "(a\<sharp>(x,y) \<Longrightarrow> PROP C) \<equiv> (a\<sharp>x \<Longrightarrow> a\<sharp>y \<Longrightarrow> PROP C)"
18294 bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	292	by rule (simp_all add: fresh_prod)
bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	293
bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	294
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	295	section {* Abstract Properties for Permutations and Atoms *}
c35381811d5c Initial revision. berghofe parents: diff changeset	296	(=========================================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	297
c35381811d5c Initial revision. berghofe parents: diff changeset	298	(* properties for being a permutation type *)
c35381811d5c Initial revision. berghofe parents: diff changeset	299	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	300	"pt TYPE('a) TYPE('x) \<equiv>
c35381811d5c Initial revision. berghofe parents: diff changeset	301	(\<forall>(x::'a). ([]::'x prm)\<bullet>x = x) \<and>
c35381811d5c Initial revision. berghofe parents: diff changeset	302	(\<forall>(pi1::'x prm) (pi2::'x prm) (x::'a). (pi1@pi2)\<bullet>x = pi1\<bullet>(pi2\<bullet>x)) \<and>
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	303	(\<forall>(pi1::'x prm) (pi2::'x prm) (x::'a). pi1 \<triangleq> pi2 \<longrightarrow> pi1\<bullet>x = pi2\<bullet>x)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	304
c35381811d5c Initial revision. berghofe parents: diff changeset	305	(* properties for being an atom type *)
c35381811d5c Initial revision. berghofe parents: diff changeset	306	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	307	"at TYPE('x) \<equiv>
c35381811d5c Initial revision. berghofe parents: diff changeset	308	(\<forall>(x::'x). ([]::'x prm)\<bullet>x = x) \<and>
c35381811d5c Initial revision. berghofe parents: diff changeset	309	(\<forall>(a::'x) (b::'x) (pi::'x prm) (x::'x). ((a,b)#(pi::'x prm))\<bullet>x = swap (a,b) (pi\<bullet>x)) \<and>
c35381811d5c Initial revision. berghofe parents: diff changeset	310	(\<forall>(a::'x) (b::'x) (c::'x). swap (a,b) c = (if a=c then b else (if b=c then a else c))) \<and>
c35381811d5c Initial revision. berghofe parents: diff changeset	311	(infinite (UNIV::'x set))"
c35381811d5c Initial revision. berghofe parents: diff changeset	312
c35381811d5c Initial revision. berghofe parents: diff changeset	313	(* property of two atom-types being disjoint *)
c35381811d5c Initial revision. berghofe parents: diff changeset	314	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	315	"disjoint TYPE('x) TYPE('y) \<equiv>
c35381811d5c Initial revision. berghofe parents: diff changeset	316	(\<forall>(pi::'x prm)(x::'y). pi\<bullet>x = x) \<and>
c35381811d5c Initial revision. berghofe parents: diff changeset	317	(\<forall>(pi::'y prm)(x::'x). pi\<bullet>x = x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	318
c35381811d5c Initial revision. berghofe parents: diff changeset	319	(* composition property of two permutation on a type 'a *)
c35381811d5c Initial revision. berghofe parents: diff changeset	320	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	321	"cp TYPE ('a) TYPE('x) TYPE('y) \<equiv>
c35381811d5c Initial revision. berghofe parents: diff changeset	322	(\<forall>(pi2::'y prm) (pi1::'x prm) (x::'a) . pi1\<bullet>(pi2\<bullet>x) = (pi1\<bullet>pi2)\<bullet>(pi1\<bullet>x))"
c35381811d5c Initial revision. berghofe parents: diff changeset	323
c35381811d5c Initial revision. berghofe parents: diff changeset	324	(* property of having finite support *)
c35381811d5c Initial revision. berghofe parents: diff changeset	325	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	326	"fs TYPE('a) TYPE('x) \<equiv> \<forall>(x::'a). finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	327
c35381811d5c Initial revision. berghofe parents: diff changeset	328	section {* Lemmas about the atom-type properties*}
c35381811d5c Initial revision. berghofe parents: diff changeset	329	(==============================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	330
c35381811d5c Initial revision. berghofe parents: diff changeset	331	lemma at1:
c35381811d5c Initial revision. berghofe parents: diff changeset	332	fixes x::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	333	assumes a: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	334	shows "([]::'x prm)\<bullet>x = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	335	using a by (simp add: at_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	336
c35381811d5c Initial revision. berghofe parents: diff changeset	337	lemma at2:
c35381811d5c Initial revision. berghofe parents: diff changeset	338	fixes a ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	339	and b ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	340	and x ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	341	and pi::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	342	assumes a: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	343	shows "((a,b)#pi)\<bullet>x = swap (a,b) (pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	344	using a by (simp only: at_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	345
c35381811d5c Initial revision. berghofe parents: diff changeset	346	lemma at3:
c35381811d5c Initial revision. berghofe parents: diff changeset	347	fixes a ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	348	and b ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	349	and c ::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	350	assumes a: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	351	shows "swap (a,b) c = (if a=c then b else (if b=c then a else c))"
c35381811d5c Initial revision. berghofe parents: diff changeset	352	using a by (simp only: at_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	353
c35381811d5c Initial revision. berghofe parents: diff changeset	354	(* rules to calculate simple premutations *)
c35381811d5c Initial revision. berghofe parents: diff changeset	355	lemmas at_calc = at2 at1 at3
c35381811d5c Initial revision. berghofe parents: diff changeset	356
c35381811d5c Initial revision. berghofe parents: diff changeset	357	lemma at4:
c35381811d5c Initial revision. berghofe parents: diff changeset	358	assumes a: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	359	shows "infinite (UNIV::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	360	using a by (simp add: at_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	361
c35381811d5c Initial revision. berghofe parents: diff changeset	362	lemma at_append:
c35381811d5c Initial revision. berghofe parents: diff changeset	363	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	364	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	365	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	366	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	367	shows "(pi1@pi2)\<bullet>c = pi1\<bullet>(pi2\<bullet>c)"
c35381811d5c Initial revision. berghofe parents: diff changeset	368	proof (induct pi1)
c35381811d5c Initial revision. berghofe parents: diff changeset	369	case Nil show ?case by (simp add: at1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	370	next
c35381811d5c Initial revision. berghofe parents: diff changeset	371	case (Cons x xs)
18053 2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	372	have "(xs@pi2)\<bullet>c = xs\<bullet>(pi2\<bullet>c)" by fact
2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	373	also have "(x#xs)@pi2 = x#(xs@pi2)" by simp
2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	374	ultimately show ?case by (cases "x", simp add: at2[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	375	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	376
c35381811d5c Initial revision. berghofe parents: diff changeset	377	lemma at_swap:
c35381811d5c Initial revision. berghofe parents: diff changeset	378	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	379	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	380	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	381	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	382	shows "swap (a,b) (swap (a,b) c) = c"
c35381811d5c Initial revision. berghofe parents: diff changeset	383	by (auto simp add: at3[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	384
c35381811d5c Initial revision. berghofe parents: diff changeset	385	lemma at_rev_pi:
c35381811d5c Initial revision. berghofe parents: diff changeset	386	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	387	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	388	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	389	shows "(rev pi)\<bullet>(pi\<bullet>c) = c"
c35381811d5c Initial revision. berghofe parents: diff changeset	390	proof(induct pi)
c35381811d5c Initial revision. berghofe parents: diff changeset	391	case Nil show ?case by (simp add: at1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	392	next
c35381811d5c Initial revision. berghofe parents: diff changeset	393	case (Cons x xs) thus ?case
c35381811d5c Initial revision. berghofe parents: diff changeset	394	by (cases "x", simp add: at2[OF at] at_append[OF at] at1[OF at] at_swap[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	395	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	396
c35381811d5c Initial revision. berghofe parents: diff changeset	397	lemma at_pi_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	398	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	399	and x :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	400	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	401	shows "pi\<bullet>((rev pi)\<bullet>x) = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	402	by (rule at_rev_pi[OF at, of "rev pi" _,simplified])
c35381811d5c Initial revision. berghofe parents: diff changeset	403
c35381811d5c Initial revision. berghofe parents: diff changeset	404	lemma at_bij1:
c35381811d5c Initial revision. berghofe parents: diff changeset	405	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	406	and x :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	407	and y :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	408	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	409	and a: "(pi\<bullet>x) = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	410	shows "x=(rev pi)\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	411	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	412	from a have "y=(pi\<bullet>x)" by (rule sym)
c35381811d5c Initial revision. berghofe parents: diff changeset	413	thus ?thesis by (simp only: at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	414	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	415
c35381811d5c Initial revision. berghofe parents: diff changeset	416	lemma at_bij2:
c35381811d5c Initial revision. berghofe parents: diff changeset	417	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	418	and x :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	419	and y :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	420	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	421	and a: "((rev pi)\<bullet>x) = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	422	shows "x=pi\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	423	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	424	from a have "y=((rev pi)\<bullet>x)" by (rule sym)
c35381811d5c Initial revision. berghofe parents: diff changeset	425	thus ?thesis by (simp only: at_pi_rev[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	426	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	427
c35381811d5c Initial revision. berghofe parents: diff changeset	428	lemma at_bij:
c35381811d5c Initial revision. berghofe parents: diff changeset	429	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	430	and x :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	431	and y :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	432	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	433	shows "(pi\<bullet>x = pi\<bullet>y) = (x=y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	434	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	435	assume "pi\<bullet>x = pi\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	436	hence "x=(rev pi)\<bullet>(pi\<bullet>y)" by (rule at_bij1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	437	thus "x=y" by (simp only: at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	438	next
c35381811d5c Initial revision. berghofe parents: diff changeset	439	assume "x=y"
c35381811d5c Initial revision. berghofe parents: diff changeset	440	thus "pi\<bullet>x = pi\<bullet>y" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	441	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	442
c35381811d5c Initial revision. berghofe parents: diff changeset	443	lemma at_supp:
c35381811d5c Initial revision. berghofe parents: diff changeset	444	fixes x :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	445	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	446	shows "supp x = {x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	447	proof (simp add: supp_def Collect_conj_eq Collect_imp_eq at_calc[OF at], auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	448	assume f: "finite {b::'x. b \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	449	have a1: "{b::'x. b \<noteq> x} = UNIV-{x}" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	450	have a2: "infinite (UNIV::'x set)" by (rule at4[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	451	from f a1 a2 show False by force
c35381811d5c Initial revision. berghofe parents: diff changeset	452	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	453
c35381811d5c Initial revision. berghofe parents: diff changeset	454	lemma at_fresh:
c35381811d5c Initial revision. berghofe parents: diff changeset	455	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	456	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	457	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	458	shows "(a\<sharp>b) = (a\<noteq>b)"
c35381811d5c Initial revision. berghofe parents: diff changeset	459	by (simp add: at_supp[OF at] fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	460
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	461	lemma at_prm_fresh:
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	462	fixes c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	463	and pi:: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	464	assumes at: "at TYPE('x)"
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	465	and a: "c\<sharp>pi"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	466	shows "pi\<bullet>c = c"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	467	using a
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	468	apply(induct pi)
c35381811d5c Initial revision. berghofe parents: diff changeset	469	apply(simp add: at1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	470	apply(force simp add: fresh_list_cons at2[OF at] fresh_prod at_fresh[OF at] at3[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	471	done
c35381811d5c Initial revision. berghofe parents: diff changeset	472
c35381811d5c Initial revision. berghofe parents: diff changeset	473	lemma at_prm_rev_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	474	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	475	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	476	assumes at: "at TYPE('x)"
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	477	shows "((rev pi1) \<triangleq> (rev pi2)) = (pi1 \<triangleq> pi2)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	478	proof (simp add: prm_eq_def, auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	479	fix x
c35381811d5c Initial revision. berghofe parents: diff changeset	480	assume "\<forall>x::'x. (rev pi1)\<bullet>x = (rev pi2)\<bullet>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	481	hence "(rev (pi1::'x prm))\<bullet>(pi2\<bullet>(x::'x)) = (rev (pi2::'x prm))\<bullet>(pi2\<bullet>x)" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	482	hence "(rev (pi1::'x prm))\<bullet>((pi2::'x prm)\<bullet>x) = (x::'x)" by (simp add: at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	483	hence "(pi2::'x prm)\<bullet>x = (pi1::'x prm)\<bullet>x" by (simp add: at_bij2[OF at])
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	484	thus "pi1\<bullet>x = pi2\<bullet>x" by simp
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	485	next
c35381811d5c Initial revision. berghofe parents: diff changeset	486	fix x
c35381811d5c Initial revision. berghofe parents: diff changeset	487	assume "\<forall>x::'x. pi1\<bullet>x = pi2\<bullet>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	488	hence "(pi1::'x prm)\<bullet>((rev pi2)\<bullet>x) = (pi2::'x prm)\<bullet>((rev pi2)\<bullet>(x::'x))" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	489	hence "(pi1::'x prm)\<bullet>((rev pi2)\<bullet>(x::'x)) = x" by (simp add: at_pi_rev[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	490	hence "(rev pi2)\<bullet>x = (rev pi1)\<bullet>(x::'x)" by (simp add: at_bij1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	491	thus "(rev pi1)\<bullet>x = (rev pi2)\<bullet>(x::'x)" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	492	qed
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	493
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	494	lemma at_prm_eq_append:
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	495	fixes pi1 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	496	and pi2 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	497	and pi3 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	498	assumes at: "at TYPE('x)"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	499	and a: "pi1 \<triangleq> pi2"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	500	shows "(pi3@pi1) \<triangleq> (pi3@pi2)"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	501	using a by (simp add: prm_eq_def at_append[OF at] at_bij[OF at])
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	502
19325 35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	503	lemma at_prm_eq_append':
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	504	fixes pi1 :: "'x prm"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	505	and pi2 :: "'x prm"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	506	and pi3 :: "'x prm"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	507	assumes at: "at TYPE('x)"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	508	and a: "pi1 \<triangleq> pi2"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	509	shows "(pi1@pi3) \<triangleq> (pi2@pi3)"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	510	using a by (simp add: prm_eq_def at_append[OF at])
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	511
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	512	lemma at_prm_eq_trans:
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	513	fixes pi1 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	514	and pi2 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	515	and pi3 :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	516	assumes a1: "pi1 \<triangleq> pi2"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	517	and a2: "pi2 \<triangleq> pi3"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	518	shows "pi1 \<triangleq> pi3"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	519	using a1 a2 by (auto simp add: prm_eq_def)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	520
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	521	lemma at_prm_eq_refl:
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	522	fixes pi :: "'x prm"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	523	shows "pi \<triangleq> pi"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	524	by (simp add: prm_eq_def)
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	525
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	526	lemma at_prm_rev_eq1:
c35381811d5c Initial revision. berghofe parents: diff changeset	527	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	528	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	529	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	530	shows "pi1 \<triangleq> pi2 \<Longrightarrow> (rev pi1) \<triangleq> (rev pi2)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	531	by (simp add: at_prm_rev_eq[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	532
c35381811d5c Initial revision. berghofe parents: diff changeset	533	lemma at_ds1:
c35381811d5c Initial revision. berghofe parents: diff changeset	534	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	535	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	536	shows "[(a,a)] \<triangleq> []"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	537	by (force simp add: prm_eq_def at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	538
c35381811d5c Initial revision. berghofe parents: diff changeset	539	lemma at_ds2:
c35381811d5c Initial revision. berghofe parents: diff changeset	540	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	541	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	542	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	543	assumes at: "at TYPE('x)"
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	544	shows "([(a,b)]@pi) \<triangleq> (pi@[((rev pi)\<bullet>a,(rev pi)\<bullet>b)])"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	545	by (force simp add: prm_eq_def at_append[OF at] at_bij[OF at] at_pi_rev[OF at]
c35381811d5c Initial revision. berghofe parents: diff changeset	546	at_rev_pi[OF at] at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	547
c35381811d5c Initial revision. berghofe parents: diff changeset	548	lemma at_ds3:
c35381811d5c Initial revision. berghofe parents: diff changeset	549	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	550	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	551	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	552	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	553	and a: "distinct [a,b,c]"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	554	shows "[(a,c),(b,c),(a,c)] \<triangleq> [(a,b)]"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	555	using a by (force simp add: prm_eq_def at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	556
c35381811d5c Initial revision. berghofe parents: diff changeset	557	lemma at_ds4:
c35381811d5c Initial revision. berghofe parents: diff changeset	558	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	559	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	560	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	561	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	562	shows "(pi@[(a,(rev pi)\<bullet>b)]) \<triangleq> ([(pi\<bullet>a,b)]@pi)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	563	by (force simp add: prm_eq_def at_append[OF at] at_calc[OF at] at_bij[OF at]
c35381811d5c Initial revision. berghofe parents: diff changeset	564	at_pi_rev[OF at] at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	565
c35381811d5c Initial revision. berghofe parents: diff changeset	566	lemma at_ds5:
c35381811d5c Initial revision. berghofe parents: diff changeset	567	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	568	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	569	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	570	shows "[(a,b)] \<triangleq> [(b,a)]"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	571	by (force simp add: prm_eq_def at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	572
19164 0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	573	lemma at_ds5':
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	574	fixes a :: "'x"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	575	and b :: "'x"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	576	assumes at: "at TYPE('x)"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	577	shows "[(a,b),(b,a)] \<triangleq> []"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	578	by (force simp add: prm_eq_def at_calc[OF at])
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	579
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	580	lemma at_ds6:
c35381811d5c Initial revision. berghofe parents: diff changeset	581	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	582	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	583	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	584	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	585	and a: "distinct [a,b,c]"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	586	shows "[(a,c),(a,b)] \<triangleq> [(b,c),(a,c)]"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	587	using a by (force simp add: prm_eq_def at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	588
c35381811d5c Initial revision. berghofe parents: diff changeset	589	lemma at_ds7:
c35381811d5c Initial revision. berghofe parents: diff changeset	590	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	591	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	592	shows "((rev pi)@pi) \<triangleq> []"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	593	by (simp add: prm_eq_def at1[OF at] at_append[OF at] at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	594
c35381811d5c Initial revision. berghofe parents: diff changeset	595	lemma at_ds8_aux:
c35381811d5c Initial revision. berghofe parents: diff changeset	596	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	597	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	598	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	599	and c :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	600	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	601	shows "pi\<bullet>(swap (a,b) c) = swap (pi\<bullet>a,pi\<bullet>b) (pi\<bullet>c)"
c35381811d5c Initial revision. berghofe parents: diff changeset	602	by (force simp add: at_calc[OF at] at_bij[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	603
c35381811d5c Initial revision. berghofe parents: diff changeset	604	lemma at_ds8:
c35381811d5c Initial revision. berghofe parents: diff changeset	605	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	606	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	607	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	608	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	609	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	610	shows "(pi1@pi2) \<triangleq> ((pi1\<bullet>pi2)@pi1)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	611	apply(induct_tac pi2)
c35381811d5c Initial revision. berghofe parents: diff changeset	612	apply(simp add: prm_eq_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	613	apply(auto simp add: prm_eq_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	614	apply(simp add: at2[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	615	apply(drule_tac x="aa" in spec)
c35381811d5c Initial revision. berghofe parents: diff changeset	616	apply(drule sym)
c35381811d5c Initial revision. berghofe parents: diff changeset	617	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	618	apply(simp add: at_append[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	619	apply(simp add: at2[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	620	apply(simp add: at_ds8_aux[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	621	done
c35381811d5c Initial revision. berghofe parents: diff changeset	622
c35381811d5c Initial revision. berghofe parents: diff changeset	623	lemma at_ds9:
c35381811d5c Initial revision. berghofe parents: diff changeset	624	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	625	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	626	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	627	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	628	assumes at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	629	shows " ((rev pi2)@(rev pi1)) \<triangleq> ((rev pi1)@(rev (pi1\<bullet>pi2)))"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	630	apply(induct_tac pi2)
c35381811d5c Initial revision. berghofe parents: diff changeset	631	apply(simp add: prm_eq_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	632	apply(auto simp add: prm_eq_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	633	apply(simp add: at_append[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	634	apply(simp add: at2[OF at] at1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	635	apply(drule_tac x="swap(pi1\<bullet>a,pi1\<bullet>b) aa" in spec)
c35381811d5c Initial revision. berghofe parents: diff changeset	636	apply(drule sym)
c35381811d5c Initial revision. berghofe parents: diff changeset	637	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	638	apply(simp add: at_ds8_aux[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	639	apply(simp add: at_rev_pi[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	640	done
c35381811d5c Initial revision. berghofe parents: diff changeset	641
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	642	lemma at_ds10:
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	643	fixes pi :: "'x prm"
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	644	and a :: "'x"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	645	and b :: "'x"
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	646	assumes at: "at TYPE('x)"
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	647	and a: "b\<sharp>(rev pi)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	648	shows "([(pi\<bullet>a,b)]@pi) \<triangleq> (pi@[(a,b)])"
19107 b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	649	using a
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	650	apply -
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	651	apply(rule at_prm_eq_trans)
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	652	apply(rule at_ds2[OF at])
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	653	apply(simp add: at_prm_fresh[OF at] at_rev_pi[OF at])
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	654	apply(rule at_prm_eq_refl)
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	655	done
b16a45c53884 added a few lemmas to do with permutation-equivalence for the urbanc parents: 19045 diff changeset	656
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	657	--"there always exists an atom not being in a finite set"
c35381811d5c Initial revision. berghofe parents: diff changeset	658	lemma ex_in_inf:
c35381811d5c Initial revision. berghofe parents: diff changeset	659	fixes A::"'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	660	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	661	and fs: "finite A"
c35381811d5c Initial revision. berghofe parents: diff changeset	662	shows "\<exists>c::'x. c\<notin>A"
c35381811d5c Initial revision. berghofe parents: diff changeset	663	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	664	from fs at4[OF at] have "infinite ((UNIV::'x set) - A)"
c35381811d5c Initial revision. berghofe parents: diff changeset	665	by (simp add: Diff_infinite_finite)
c35381811d5c Initial revision. berghofe parents: diff changeset	666	hence "((UNIV::'x set) - A) \<noteq> ({}::'x set)" by (force simp only:)
c35381811d5c Initial revision. berghofe parents: diff changeset	667	hence "\<exists>c::'x. c\<in>((UNIV::'x set) - A)" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	668	thus "\<exists>c::'x. c\<notin>A" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	669	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	670
c35381811d5c Initial revision. berghofe parents: diff changeset	671	--"there always exists a fresh name for an object with finite support"
c35381811d5c Initial revision. berghofe parents: diff changeset	672	lemma at_exists_fresh:
c35381811d5c Initial revision. berghofe parents: diff changeset	673	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	674	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	675	and fs: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	676	shows "\<exists>c::'x. c\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	677	by (simp add: fresh_def, rule ex_in_inf[OF at, OF fs])
c35381811d5c Initial revision. berghofe parents: diff changeset	678
18657 0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	679	lemma at_finite_select: "at (TYPE('a)) \<Longrightarrow> finite (S::'a set) \<Longrightarrow> \<exists>x. x \<notin> S"
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	680	apply (drule Diff_infinite_finite)
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	681	apply (simp add: at_def)
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	682	apply blast
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	683	apply (subgoal_tac "UNIV - S \<noteq> {}")
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	684	apply (simp only: ex_in_conv [symmetric])
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	685	apply blast
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	686	apply (rule notI)
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	687	apply simp
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	688	done
0a37df3bb99d Added theorem at_finite_select. berghofe parents: 18656 diff changeset	689
19140 5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	690	lemma at_different:
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	691	assumes at: "at TYPE('x)"
19140 5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	692	shows "\<exists>(b::'x). a\<noteq>b"
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	693	proof -
19140 5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	694	have "infinite (UNIV::'x set)" by (rule at4[OF at])
5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	695	hence inf2: "infinite (UNIV-{a})" by (rule infinite_remove)
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	696	have "(UNIV-{a}) \<noteq> ({}::'x set)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	697	proof (rule_tac ccontr, drule_tac notnotD)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	698	assume "UNIV-{a} = ({}::'x set)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	699	with inf2 have "infinite ({}::'x set)" by simp
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	700	then show "False" by (auto intro: infinite_nonempty)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	701	qed
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	702	hence "\<exists>(b::'x). b\<in>(UNIV-{a})" by blast
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	703	then obtain b::"'x" where mem2: "b\<in>(UNIV-{a})" by blast
19140 5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	704	from mem2 have "a\<noteq>b" by blast
5a98cdf99079 replaced the lemma at_two by at_different; urbanc parents: 19132 diff changeset	705	then show "\<exists>(b::'x). a\<noteq>b" by blast
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	706	qed
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	707
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	708	--"the at-props imply the pt-props"
c35381811d5c Initial revision. berghofe parents: diff changeset	709	lemma at_pt_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	710	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	711	shows "pt TYPE('x) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	712	apply(auto simp only: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	713	apply(simp only: at1[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	714	apply(simp only: at_append[OF at])
18053 2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	715	apply(simp only: prm_eq_def)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	716	done
c35381811d5c Initial revision. berghofe parents: diff changeset	717
c35381811d5c Initial revision. berghofe parents: diff changeset	718	section {* finite support properties *}
c35381811d5c Initial revision. berghofe parents: diff changeset	719	(===================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	720
c35381811d5c Initial revision. berghofe parents: diff changeset	721	lemma fs1:
c35381811d5c Initial revision. berghofe parents: diff changeset	722	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	723	assumes a: "fs TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	724	shows "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	725	using a by (simp add: fs_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	726
c35381811d5c Initial revision. berghofe parents: diff changeset	727	lemma fs_at_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	728	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	729	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	730	shows "fs TYPE('x) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	731	apply(simp add: fs_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	732	apply(simp add: at_supp[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	733	done
c35381811d5c Initial revision. berghofe parents: diff changeset	734
c35381811d5c Initial revision. berghofe parents: diff changeset	735	lemma fs_unit_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	736	shows "fs TYPE(unit) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	737	apply(simp add: fs_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	738	apply(simp add: supp_unit)
c35381811d5c Initial revision. berghofe parents: diff changeset	739	done
c35381811d5c Initial revision. berghofe parents: diff changeset	740
c35381811d5c Initial revision. berghofe parents: diff changeset	741	lemma fs_prod_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	742	assumes fsa: "fs TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	743	and fsb: "fs TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	744	shows "fs TYPE('a\<times>'b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	745	apply(unfold fs_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	746	apply(auto simp add: supp_prod)
c35381811d5c Initial revision. berghofe parents: diff changeset	747	apply(rule fs1[OF fsa])
c35381811d5c Initial revision. berghofe parents: diff changeset	748	apply(rule fs1[OF fsb])
c35381811d5c Initial revision. berghofe parents: diff changeset	749	done
c35381811d5c Initial revision. berghofe parents: diff changeset	750
18600 20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	751	lemma fs_nprod_inst:
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	752	assumes fsa: "fs TYPE('a) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	753	and fsb: "fs TYPE('b) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	754	shows "fs TYPE(('a,'b) nprod) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	755	apply(unfold fs_def, rule allI)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	756	apply(case_tac x)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	757	apply(auto simp add: supp_nprod)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	758	apply(rule fs1[OF fsa])
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	759	apply(rule fs1[OF fsb])
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	760	done
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	761
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	762	lemma fs_list_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	763	assumes fs: "fs TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	764	shows "fs TYPE('a list) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	765	apply(simp add: fs_def, rule allI)
c35381811d5c Initial revision. berghofe parents: diff changeset	766	apply(induct_tac x)
c35381811d5c Initial revision. berghofe parents: diff changeset	767	apply(simp add: supp_list_nil)
c35381811d5c Initial revision. berghofe parents: diff changeset	768	apply(simp add: supp_list_cons)
c35381811d5c Initial revision. berghofe parents: diff changeset	769	apply(rule fs1[OF fs])
c35381811d5c Initial revision. berghofe parents: diff changeset	770	done
c35381811d5c Initial revision. berghofe parents: diff changeset	771
18431 a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	772	lemma fs_option_inst:
a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	773	assumes fs: "fs TYPE('a) TYPE('x)"
a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	774	shows "fs TYPE('a option) TYPE('x)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	775	apply(simp add: fs_def, rule allI)
18431 a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	776	apply(case_tac x)
a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	777	apply(simp add: supp_none)
a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	778	apply(simp add: supp_some)
a59c79a3544c improved the finite-support proof urbanc parents: 18351 diff changeset	779	apply(rule fs1[OF fs])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	780	done
c35381811d5c Initial revision. berghofe parents: diff changeset	781
c35381811d5c Initial revision. berghofe parents: diff changeset	782	section {* Lemmas about the permutation properties *}
c35381811d5c Initial revision. berghofe parents: diff changeset	783	(=================================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	784
c35381811d5c Initial revision. berghofe parents: diff changeset	785	lemma pt1:
c35381811d5c Initial revision. berghofe parents: diff changeset	786	fixes x::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	787	assumes a: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	788	shows "([]::'x prm)\<bullet>x = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	789	using a by (simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	790
c35381811d5c Initial revision. berghofe parents: diff changeset	791	lemma pt2:
c35381811d5c Initial revision. berghofe parents: diff changeset	792	fixes pi1::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	793	and pi2::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	794	and x ::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	795	assumes a: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	796	shows "(pi1@pi2)\<bullet>x = pi1\<bullet>(pi2\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	797	using a by (simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	798
c35381811d5c Initial revision. berghofe parents: diff changeset	799	lemma pt3:
c35381811d5c Initial revision. berghofe parents: diff changeset	800	fixes pi1::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	801	and pi2::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	802	and x ::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	803	assumes a: "pt TYPE('a) TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	804	shows "pi1 \<triangleq> pi2 \<Longrightarrow> pi1\<bullet>x = pi2\<bullet>x"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	805	using a by (simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	806
c35381811d5c Initial revision. berghofe parents: diff changeset	807	lemma pt3_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	808	fixes pi1::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	809	and pi2::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	810	and x ::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	811	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	812	and at: "at TYPE('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	813	shows "pi1 \<triangleq> pi2 \<Longrightarrow> (rev pi1)\<bullet>x = (rev pi2)\<bullet>x"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	814	by (rule pt3[OF pt], simp add: at_prm_rev_eq[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	815
c35381811d5c Initial revision. berghofe parents: diff changeset	816	section {* composition properties *}
c35381811d5c Initial revision. berghofe parents: diff changeset	817	(* ============================== *)
c35381811d5c Initial revision. berghofe parents: diff changeset	818	lemma cp1:
c35381811d5c Initial revision. berghofe parents: diff changeset	819	fixes pi1::"'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	820	and pi2::"'y prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	821	and x ::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	822	assumes cp: "cp TYPE ('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	823	shows "pi1\<bullet>(pi2\<bullet>x) = (pi1\<bullet>pi2)\<bullet>(pi1\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	824	using cp by (simp add: cp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	825
c35381811d5c Initial revision. berghofe parents: diff changeset	826	lemma cp_pt_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	827	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	828	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	829	shows "cp TYPE('a) TYPE('x) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	830	apply(auto simp add: cp_def pt2[OF pt,symmetric])
c35381811d5c Initial revision. berghofe parents: diff changeset	831	apply(rule pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	832	apply(rule at_ds8[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	833	done
c35381811d5c Initial revision. berghofe parents: diff changeset	834
19638 4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	835	section {* disjointness properties *}
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	836	(=================================)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	837	lemma dj_perm_forget:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	838	fixes pi::"'y prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	839	and x ::"'x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	840	assumes dj: "disjoint TYPE('x) TYPE('y)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	841	shows "pi\<bullet>x=x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	842	using dj by (simp_all add: disjoint_def)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	843
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	844	lemma dj_perm_perm_forget:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	845	fixes pi1::"'x prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	846	and pi2::"'y prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	847	assumes dj: "disjoint TYPE('x) TYPE('y)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	848	shows "pi2\<bullet>pi1=pi1"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	849	using dj by (induct pi1, auto simp add: disjoint_def)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	850
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	851	lemma dj_cp:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	852	fixes pi1::"'x prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	853	and pi2::"'y prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	854	and x ::"'a"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	855	assumes cp: "cp TYPE ('a) TYPE('x) TYPE('y)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	856	and dj: "disjoint TYPE('y) TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	857	shows "pi1\<bullet>(pi2\<bullet>x) = (pi2)\<bullet>(pi1\<bullet>x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	858	by (simp add: cp1[OF cp] dj_perm_perm_forget[OF dj])
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	859
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	860	lemma dj_supp:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	861	fixes a::"'x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	862	assumes dj: "disjoint TYPE('x) TYPE('y)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	863	shows "(supp a) = ({}::'y set)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	864	apply(simp add: supp_def dj_perm_forget[OF dj])
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	865	done
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	866
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	867	section {* permutation type instances *}
c35381811d5c Initial revision. berghofe parents: diff changeset	868	(* ===================================*)
c35381811d5c Initial revision. berghofe parents: diff changeset	869
c35381811d5c Initial revision. berghofe parents: diff changeset	870	lemma pt_set_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	871	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	872	shows "pt TYPE('a set) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	873	apply(simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	874	apply(simp_all add: perm_set_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	875	apply(simp add: pt1[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	876	apply(force simp add: pt2[OF pt] pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	877	done
c35381811d5c Initial revision. berghofe parents: diff changeset	878
c35381811d5c Initial revision. berghofe parents: diff changeset	879	lemma pt_list_nil:
c35381811d5c Initial revision. berghofe parents: diff changeset	880	fixes xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	881	assumes pt: "pt TYPE('a) TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	882	shows "([]::'x prm)\<bullet>xs = xs"
c35381811d5c Initial revision. berghofe parents: diff changeset	883	apply(induct_tac xs)
c35381811d5c Initial revision. berghofe parents: diff changeset	884	apply(simp_all add: pt1[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	885	done
c35381811d5c Initial revision. berghofe parents: diff changeset	886
c35381811d5c Initial revision. berghofe parents: diff changeset	887	lemma pt_list_append:
c35381811d5c Initial revision. berghofe parents: diff changeset	888	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	889	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	890	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	891	assumes pt: "pt TYPE('a) TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	892	shows "(pi1@pi2)\<bullet>xs = pi1\<bullet>(pi2\<bullet>xs)"
c35381811d5c Initial revision. berghofe parents: diff changeset	893	apply(induct_tac xs)
c35381811d5c Initial revision. berghofe parents: diff changeset	894	apply(simp_all add: pt2[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	895	done
c35381811d5c Initial revision. berghofe parents: diff changeset	896
c35381811d5c Initial revision. berghofe parents: diff changeset	897	lemma pt_list_prm_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	898	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	899	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	900	and xs :: "'a list"
c35381811d5c Initial revision. berghofe parents: diff changeset	901	assumes pt: "pt TYPE('a) TYPE ('x)"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	902	shows "pi1 \<triangleq> pi2 \<Longrightarrow> pi1\<bullet>xs = pi2\<bullet>xs"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	903	apply(induct_tac xs)
c35381811d5c Initial revision. berghofe parents: diff changeset	904	apply(simp_all add: prm_eq_def pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	905	done
c35381811d5c Initial revision. berghofe parents: diff changeset	906
c35381811d5c Initial revision. berghofe parents: diff changeset	907	lemma pt_list_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	908	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	909	shows "pt TYPE('a list) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	910	apply(auto simp only: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	911	apply(rule pt_list_nil[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	912	apply(rule pt_list_append[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	913	apply(rule pt_list_prm_eq[OF pt],assumption)
c35381811d5c Initial revision. berghofe parents: diff changeset	914	done
c35381811d5c Initial revision. berghofe parents: diff changeset	915
c35381811d5c Initial revision. berghofe parents: diff changeset	916	lemma pt_unit_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	917	shows "pt TYPE(unit) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	918	by (simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	919
c35381811d5c Initial revision. berghofe parents: diff changeset	920	lemma pt_prod_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	921	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	922	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	923	shows "pt TYPE('a \<times> 'b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	924	apply(auto simp add: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	925	apply(rule pt1[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	926	apply(rule pt1[OF ptb])
c35381811d5c Initial revision. berghofe parents: diff changeset	927	apply(rule pt2[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	928	apply(rule pt2[OF ptb])
c35381811d5c Initial revision. berghofe parents: diff changeset	929	apply(rule pt3[OF pta],assumption)
c35381811d5c Initial revision. berghofe parents: diff changeset	930	apply(rule pt3[OF ptb],assumption)
c35381811d5c Initial revision. berghofe parents: diff changeset	931	done
c35381811d5c Initial revision. berghofe parents: diff changeset	932
18600 20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	933	lemma pt_nprod_inst:
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	934	assumes pta: "pt TYPE('a) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	935	and ptb: "pt TYPE('b) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	936	shows "pt TYPE(('a,'b) nprod) TYPE('x)"
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	937	apply(auto simp add: pt_def)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	938	apply(case_tac x)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	939	apply(simp add: pt1[OF pta] pt1[OF ptb])
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	940	apply(case_tac x)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	941	apply(simp add: pt2[OF pta] pt2[OF ptb])
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	942	apply(case_tac x)
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	943	apply(simp add: pt3[OF pta] pt3[OF ptb])
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	944	done
20ad06db427b added private datatype nprod (copy of prod) to be urbanc parents: 18579 diff changeset	945
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	946	lemma pt_fun_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	947	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	948	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	949	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	950	shows "pt TYPE('a\<Rightarrow>'b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	951	apply(auto simp only: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	952	apply(simp_all add: perm_fun_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	953	apply(simp add: pt1[OF pta] pt1[OF ptb])
c35381811d5c Initial revision. berghofe parents: diff changeset	954	apply(simp add: pt2[OF pta] pt2[OF ptb])
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	955	apply(subgoal_tac "(rev pi1) \<triangleq> (rev pi2)")(A)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	956	apply(simp add: pt3[OF pta] pt3[OF ptb])
c35381811d5c Initial revision. berghofe parents: diff changeset	957	(A)
c35381811d5c Initial revision. berghofe parents: diff changeset	958	apply(simp add: at_prm_rev_eq[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	959	done
c35381811d5c Initial revision. berghofe parents: diff changeset	960
c35381811d5c Initial revision. berghofe parents: diff changeset	961	lemma pt_option_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	962	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	963	shows "pt TYPE('a option) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	964	apply(auto simp only: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	965	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	966	apply(simp_all add: pt1[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	967	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	968	apply(simp_all add: pt2[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	969	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	970	apply(simp_all add: pt3[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	971	done
c35381811d5c Initial revision. berghofe parents: diff changeset	972
c35381811d5c Initial revision. berghofe parents: diff changeset	973	lemma pt_noption_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	974	assumes pta: "pt TYPE('a) TYPE('x)"
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	975	shows "pt TYPE('a noption) TYPE('x)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	976	apply(auto simp only: pt_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	977	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	978	apply(simp_all add: pt1[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	979	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	980	apply(simp_all add: pt2[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	981	apply(case_tac "x")
c35381811d5c Initial revision. berghofe parents: diff changeset	982	apply(simp_all add: pt3[OF pta])
c35381811d5c Initial revision. berghofe parents: diff changeset	983	done
c35381811d5c Initial revision. berghofe parents: diff changeset	984
c35381811d5c Initial revision. berghofe parents: diff changeset	985	section {* further lemmas for permutation types *}
c35381811d5c Initial revision. berghofe parents: diff changeset	986	(==============================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	987
19771 b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	988	lemma perm_diff:
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	989	fixes X::"'a set"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	990	and Y::"'a set"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	991	and pi::"'x prm"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	992	assumes pt: "pt TYPE('a) TYPE('x)"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	993	and at: "at TYPE('x)"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	994	shows "pi \<bullet> (X - Y) = (pi \<bullet> X) - (pi \<bullet> Y)"
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	995	by (auto simp add: perm_set_def pt_bij[OF pt, OF at])
b4a0da62126e added the lemma perm_diff urbanc parents: 19751 diff changeset	996
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	997	lemma pt_rev_pi:
c35381811d5c Initial revision. berghofe parents: diff changeset	998	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	999	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1000	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1001	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1002	shows "(rev pi)\<bullet>(pi\<bullet>x) = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1003	proof -
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	1004	have "((rev pi)@pi) \<triangleq> ([]::'x prm)" by (simp add: at_ds7[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1005	hence "((rev pi)@pi)\<bullet>(x::'a) = ([]::'x prm)\<bullet>x" by (simp add: pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1006	thus ?thesis by (simp add: pt1[OF pt] pt2[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1007	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1008
c35381811d5c Initial revision. berghofe parents: diff changeset	1009	lemma pt_pi_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	1010	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1011	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1012	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1013	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1014	shows "pi\<bullet>((rev pi)\<bullet>x) = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1015	by (simp add: pt_rev_pi[OF pt, OF at,of "rev pi" "x",simplified])
c35381811d5c Initial revision. berghofe parents: diff changeset	1016
c35381811d5c Initial revision. berghofe parents: diff changeset	1017	lemma pt_bij1:
c35381811d5c Initial revision. berghofe parents: diff changeset	1018	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1019	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1020	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1021	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1022	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1023	and a: "(pi\<bullet>x) = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1024	shows "x=(rev pi)\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1025	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1026	from a have "y=(pi\<bullet>x)" by (rule sym)
c35381811d5c Initial revision. berghofe parents: diff changeset	1027	thus ?thesis by (simp only: pt_rev_pi[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1028	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1029
c35381811d5c Initial revision. berghofe parents: diff changeset	1030	lemma pt_bij2:
c35381811d5c Initial revision. berghofe parents: diff changeset	1031	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1032	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1033	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1034	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1035	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1036	and a: "x = (rev pi)\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1037	shows "(pi\<bullet>x)=y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1038	using a by (simp add: pt_pi_rev[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1039
c35381811d5c Initial revision. berghofe parents: diff changeset	1040	lemma pt_bij:
c35381811d5c Initial revision. berghofe parents: diff changeset	1041	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1042	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1043	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1044	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1045	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1046	shows "(pi\<bullet>x = pi\<bullet>y) = (x=y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1047	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	1048	assume "pi\<bullet>x = pi\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1049	hence "x=(rev pi)\<bullet>(pi\<bullet>y)" by (rule pt_bij1[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1050	thus "x=y" by (simp only: pt_rev_pi[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1051	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1052	assume "x=y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1053	thus "pi\<bullet>x = pi\<bullet>y" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1054	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1055
c35381811d5c Initial revision. berghofe parents: diff changeset	1056	lemma pt_bij3:
c35381811d5c Initial revision. berghofe parents: diff changeset	1057	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1058	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1059	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1060	assumes a: "x=y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1061	shows "(pi\<bullet>x = pi\<bullet>y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1062	using a by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1063
c35381811d5c Initial revision. berghofe parents: diff changeset	1064	lemma pt_bij4:
c35381811d5c Initial revision. berghofe parents: diff changeset	1065	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1066	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1067	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1068	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1069	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1070	and a: "pi\<bullet>x = pi\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1071	shows "x = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1072	using a by (simp add: pt_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1073
c35381811d5c Initial revision. berghofe parents: diff changeset	1074	lemma pt_swap_bij:
c35381811d5c Initial revision. berghofe parents: diff changeset	1075	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1076	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1077	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1078	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1079	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1080	shows "[(a,b)]\<bullet>([(a,b)]\<bullet>x) = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1081	by (rule pt_bij2[OF pt, OF at], simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	1082
19164 0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1083	lemma pt_swap_bij':
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1084	fixes a :: "'x"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1085	and b :: "'x"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1086	and x :: "'a"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1087	assumes pt: "pt TYPE('a) TYPE('x)"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1088	and at: "at TYPE('x)"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1089	shows "[(a,b)]\<bullet>([(b,a)]\<bullet>x) = x"
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1090	apply(simp add: pt2[OF pt,symmetric])
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1091	apply(rule trans)
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1092	apply(rule pt3[OF pt])
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1093	apply(rule at_ds5'[OF at])
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1094	apply(rule pt1[OF pt])
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1095	done
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	1096
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1097	lemma pt_set_bij1:
c35381811d5c Initial revision. berghofe parents: diff changeset	1098	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1099	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1100	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1101	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1102	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1103	shows "((pi\<bullet>x)\<in>X) = (x\<in>((rev pi)\<bullet>X))"
c35381811d5c Initial revision. berghofe parents: diff changeset	1104	by (force simp add: perm_set_def pt_rev_pi[OF pt, OF at] pt_pi_rev[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1105
c35381811d5c Initial revision. berghofe parents: diff changeset	1106	lemma pt_set_bij1a:
c35381811d5c Initial revision. berghofe parents: diff changeset	1107	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1108	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1109	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1110	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1111	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1112	shows "(x\<in>(pi\<bullet>X)) = (((rev pi)\<bullet>x)\<in>X)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1113	by (force simp add: perm_set_def pt_rev_pi[OF pt, OF at] pt_pi_rev[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1114
c35381811d5c Initial revision. berghofe parents: diff changeset	1115	lemma pt_set_bij:
c35381811d5c Initial revision. berghofe parents: diff changeset	1116	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1117	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1118	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1119	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1120	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1121	shows "((pi\<bullet>x)\<in>(pi\<bullet>X)) = (x\<in>X)"
18053 2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	1122	by (simp add: perm_set_def pt_bij[OF pt, OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1123
c35381811d5c Initial revision. berghofe parents: diff changeset	1124	lemma pt_set_bij2:
c35381811d5c Initial revision. berghofe parents: diff changeset	1125	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1126	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1127	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1128	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1129	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1130	and a: "x\<in>X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1131	shows "(pi\<bullet>x)\<in>(pi\<bullet>X)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1132	using a by (simp add: pt_set_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1133
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1134	lemma pt_set_bij2a:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1135	fixes pi :: "'x prm"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1136	and x :: "'a"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1137	and X :: "'a set"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1138	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1139	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1140	and a: "x\<in>((rev pi)\<bullet>X)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1141	shows "(pi\<bullet>x)\<in>X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1142	using a by (simp add: pt_set_bij1[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1143
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1144	lemma pt_set_bij3:
c35381811d5c Initial revision. berghofe parents: diff changeset	1145	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1146	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1147	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1148	shows "pi\<bullet>(x\<in>X) = (x\<in>X)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1149	apply(case_tac "x\<in>X = True")
c35381811d5c Initial revision. berghofe parents: diff changeset	1150	apply(auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	1151	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1152
18159 08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1153	lemma pt_subseteq_eqvt:
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1154	fixes pi :: "'x prm"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1155	and Y :: "'a set"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1156	and X :: "'a set"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1157	assumes pt: "pt TYPE('a) TYPE('x)"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1158	and at: "at TYPE('x)"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1159	shows "((pi\<bullet>X)\<subseteq>(pi\<bullet>Y)) = (X\<subseteq>Y)"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1160	proof (auto)
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1161	fix x::"'a"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1162	assume a: "(pi\<bullet>X)\<subseteq>(pi\<bullet>Y)"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1163	and "x\<in>X"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1164	hence "(pi\<bullet>x)\<in>(pi\<bullet>X)" by (simp add: pt_set_bij[OF pt, OF at])
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1165	with a have "(pi\<bullet>x)\<in>(pi\<bullet>Y)" by force
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1166	thus "x\<in>Y" by (simp add: pt_set_bij[OF pt, OF at])
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1167	next
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1168	fix x::"'a"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1169	assume a: "X\<subseteq>Y"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1170	and "x\<in>(pi\<bullet>X)"
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1171	thus "x\<in>(pi\<bullet>Y)" by (force simp add: pt_set_bij1a[OF pt, OF at])
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1172	qed
08282ca0402e added a few equivariance lemmas (they need to be automated urbanc parents: 18068 diff changeset	1173
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1174	-- "some helper lemmas for the pt_perm_supp_ineq lemma"
c35381811d5c Initial revision. berghofe parents: diff changeset	1175	lemma Collect_permI:
c35381811d5c Initial revision. berghofe parents: diff changeset	1176	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1177	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1178	assumes a: "\<forall>x. (P1 x = P2 x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1179	shows "{pi\<bullet>x\| x. P1 x} = {pi\<bullet>x\| x. P2 x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1180	using a by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1181
c35381811d5c Initial revision. berghofe parents: diff changeset	1182	lemma Infinite_cong:
c35381811d5c Initial revision. berghofe parents: diff changeset	1183	assumes a: "X = Y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1184	shows "infinite X = infinite Y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1185	using a by (simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	1186
c35381811d5c Initial revision. berghofe parents: diff changeset	1187	lemma pt_set_eq_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1188	fixes pi :: "'y prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1189	assumes pt: "pt TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1190	and at: "at TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1191	shows "{pi\<bullet>x\| x::'x. P x} = {x::'x. P ((rev pi)\<bullet>x)}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1192	by (force simp only: pt_rev_pi[OF pt, OF at] pt_pi_rev[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1193
c35381811d5c Initial revision. berghofe parents: diff changeset	1194	lemma pt_inject_on_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1195	fixes X :: "'y set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1196	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1197	assumes pt: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1198	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1199	shows "inj_on (perm pi) X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1200	proof (unfold inj_on_def, intro strip)
c35381811d5c Initial revision. berghofe parents: diff changeset	1201	fix x::"'y" and y::"'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1202	assume "pi\<bullet>x = pi\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1203	thus "x=y" by (simp add: pt_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1204	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1205
c35381811d5c Initial revision. berghofe parents: diff changeset	1206	lemma pt_set_finite_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1207	fixes X :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1208	and pi :: "'y prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1209	assumes pt: "pt TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1210	and at: "at TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1211	shows "finite (pi\<bullet>X) = finite X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1212	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1213	have image: "(pi\<bullet>X) = (perm pi ` X)" by (force simp only: perm_set_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1214	show ?thesis
c35381811d5c Initial revision. berghofe parents: diff changeset	1215	proof (rule iffI)
c35381811d5c Initial revision. berghofe parents: diff changeset	1216	assume "finite (pi\<bullet>X)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1217	hence "finite (perm pi ` X)" using image by (simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	1218	thus "finite X" using pt_inject_on_ineq[OF pt, OF at] by (rule finite_imageD)
c35381811d5c Initial revision. berghofe parents: diff changeset	1219	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1220	assume "finite X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1221	hence "finite (perm pi ` X)" by (rule finite_imageI)
c35381811d5c Initial revision. berghofe parents: diff changeset	1222	thus "finite (pi\<bullet>X)" using image by (simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	1223	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1224	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1225
c35381811d5c Initial revision. berghofe parents: diff changeset	1226	lemma pt_set_infinite_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1227	fixes X :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1228	and pi :: "'y prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1229	assumes pt: "pt TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1230	and at: "at TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1231	shows "infinite (pi\<bullet>X) = infinite X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1232	using pt at by (simp add: pt_set_finite_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1233
c35381811d5c Initial revision. berghofe parents: diff changeset	1234	lemma pt_perm_supp_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1235	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1236	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1237	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1238	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1239	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1240	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1241	shows "(pi\<bullet>((supp x)::'y set)) = supp (pi\<bullet>x)" (is "?LHS = ?RHS")
c35381811d5c Initial revision. berghofe parents: diff changeset	1242	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1243	have "?LHS = {pi\<bullet>a \| a. infinite {b. [(a,b)]\<bullet>x \<noteq> x}}" by (simp add: supp_def perm_set_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1244	also have "\<dots> = {pi\<bullet>a \| a. infinite {pi\<bullet>b \| b. [(a,b)]\<bullet>x \<noteq> x}}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1245	proof (rule Collect_permI, rule allI, rule iffI)
c35381811d5c Initial revision. berghofe parents: diff changeset	1246	fix a
c35381811d5c Initial revision. berghofe parents: diff changeset	1247	assume "infinite {b::'y. [(a,b)]\<bullet>x \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1248	hence "infinite (pi\<bullet>{b::'y. [(a,b)]\<bullet>x \<noteq> x})" by (simp add: pt_set_infinite_ineq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1249	thus "infinite {pi\<bullet>b \|b::'y. [(a,b)]\<bullet>x \<noteq> x}" by (simp add: perm_set_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1250	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1251	fix a
c35381811d5c Initial revision. berghofe parents: diff changeset	1252	assume "infinite {pi\<bullet>b \|b::'y. [(a,b)]\<bullet>x \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1253	hence "infinite (pi\<bullet>{b::'y. [(a,b)]\<bullet>x \<noteq> x})" by (simp add: perm_set_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1254	thus "infinite {b::'y. [(a,b)]\<bullet>x \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1255	by (simp add: pt_set_infinite_ineq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1256	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1257	also have "\<dots> = {a. infinite {b::'y. [((rev pi)\<bullet>a,(rev pi)\<bullet>b)]\<bullet>x \<noteq> x}}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1258	by (simp add: pt_set_eq_ineq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1259	also have "\<dots> = {a. infinite {b. pi\<bullet>([((rev pi)\<bullet>a,(rev pi)\<bullet>b)]\<bullet>x) \<noteq> (pi\<bullet>x)}}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1260	by (simp add: pt_bij[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1261	also have "\<dots> = {a. infinite {b. [(a,b)]\<bullet>(pi\<bullet>x) \<noteq> (pi\<bullet>x)}}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1262	proof (rule Collect_cong, rule Infinite_cong, rule Collect_cong)
c35381811d5c Initial revision. berghofe parents: diff changeset	1263	fix a::"'y" and b::"'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1264	have "pi\<bullet>(([((rev pi)\<bullet>a,(rev pi)\<bullet>b)])\<bullet>x) = [(a,b)]\<bullet>(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1265	by (simp add: cp1[OF cp] pt_pi_rev[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1266	thus "(pi\<bullet>([((rev pi)\<bullet>a,(rev pi)\<bullet>b)]\<bullet>x) \<noteq> pi\<bullet>x) = ([(a,b)]\<bullet>(pi\<bullet>x) \<noteq> pi\<bullet>x)" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1267	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1268	finally show "?LHS = ?RHS" by (simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1269	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1270
c35381811d5c Initial revision. berghofe parents: diff changeset	1271	lemma pt_perm_supp:
c35381811d5c Initial revision. berghofe parents: diff changeset	1272	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1273	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1274	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1275	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1276	shows "(pi\<bullet>((supp x)::'x set)) = supp (pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1277	apply(rule pt_perm_supp_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1278	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1279	apply(rule at_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1280	apply(rule at)+
c35381811d5c Initial revision. berghofe parents: diff changeset	1281	apply(rule cp_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1282	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1283	apply(rule at)
c35381811d5c Initial revision. berghofe parents: diff changeset	1284	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1285
c35381811d5c Initial revision. berghofe parents: diff changeset	1286	lemma pt_supp_finite_pi:
c35381811d5c Initial revision. berghofe parents: diff changeset	1287	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1288	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1289	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1290	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1291	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1292	shows "finite ((supp (pi\<bullet>x))::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1293	apply(simp add: pt_perm_supp[OF pt, OF at, symmetric])
c35381811d5c Initial revision. berghofe parents: diff changeset	1294	apply(simp add: pt_set_finite_ineq[OF at_pt_inst[OF at], OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1295	apply(rule f)
c35381811d5c Initial revision. berghofe parents: diff changeset	1296	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1297
c35381811d5c Initial revision. berghofe parents: diff changeset	1298	lemma pt_fresh_left_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1299	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1300	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1301	and a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1302	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1303	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1304	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1305	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1306	shows "a\<sharp>(pi\<bullet>x) = ((rev pi)\<bullet>a)\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1307	apply(simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1308	apply(simp add: pt_set_bij1[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1309	apply(simp add: pt_perm_supp_ineq[OF pta, OF ptb, OF at, OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	1310	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1311
c35381811d5c Initial revision. berghofe parents: diff changeset	1312	lemma pt_fresh_right_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1313	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1314	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1315	and a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1316	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1317	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1318	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1319	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1320	shows "(pi\<bullet>a)\<sharp>x = a\<sharp>((rev pi)\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1321	apply(simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1322	apply(simp add: pt_set_bij1[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1323	apply(simp add: pt_perm_supp_ineq[OF pta, OF ptb, OF at, OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	1324	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1325
c35381811d5c Initial revision. berghofe parents: diff changeset	1326	lemma pt_fresh_bij_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1327	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1328	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1329	and a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1330	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1331	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1332	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1333	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1334	shows "(pi\<bullet>a)\<sharp>(pi\<bullet>x) = a\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1335	apply(simp add: pt_fresh_left_ineq[OF pta, OF ptb, OF at, OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	1336	apply(simp add: pt_rev_pi[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1337	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1338
c35381811d5c Initial revision. berghofe parents: diff changeset	1339	lemma pt_fresh_left:
c35381811d5c Initial revision. berghofe parents: diff changeset	1340	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1341	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1342	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1343	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1344	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1345	shows "a\<sharp>(pi\<bullet>x) = ((rev pi)\<bullet>a)\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1346	apply(rule pt_fresh_left_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1347	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1348	apply(rule at_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1349	apply(rule at)+
c35381811d5c Initial revision. berghofe parents: diff changeset	1350	apply(rule cp_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1351	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1352	apply(rule at)
c35381811d5c Initial revision. berghofe parents: diff changeset	1353	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1354
c35381811d5c Initial revision. berghofe parents: diff changeset	1355	lemma pt_fresh_right:
c35381811d5c Initial revision. berghofe parents: diff changeset	1356	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1357	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1358	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1359	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1360	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1361	shows "(pi\<bullet>a)\<sharp>x = a\<sharp>((rev pi)\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1362	apply(rule pt_fresh_right_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1363	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1364	apply(rule at_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1365	apply(rule at)+
c35381811d5c Initial revision. berghofe parents: diff changeset	1366	apply(rule cp_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1367	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1368	apply(rule at)
c35381811d5c Initial revision. berghofe parents: diff changeset	1369	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1370
c35381811d5c Initial revision. berghofe parents: diff changeset	1371	lemma pt_fresh_bij:
c35381811d5c Initial revision. berghofe parents: diff changeset	1372	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1373	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1374	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1375	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1376	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1377	shows "(pi\<bullet>a)\<sharp>(pi\<bullet>x) = a\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1378	apply(rule pt_fresh_bij_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1379	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1380	apply(rule at_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1381	apply(rule at)+
c35381811d5c Initial revision. berghofe parents: diff changeset	1382	apply(rule cp_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	1383	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	1384	apply(rule at)
c35381811d5c Initial revision. berghofe parents: diff changeset	1385	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1386
c35381811d5c Initial revision. berghofe parents: diff changeset	1387	lemma pt_fresh_bij1:
c35381811d5c Initial revision. berghofe parents: diff changeset	1388	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1389	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1390	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1391	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1392	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1393	and a: "a\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1394	shows "(pi\<bullet>a)\<sharp>(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1395	using a by (simp add: pt_fresh_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1396
19566 63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1397	lemma pt_fresh_bij2:
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1398	fixes pi :: "'x prm"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1399	and x :: "'a"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1400	and a :: "'x"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1401	assumes pt: "pt TYPE('a) TYPE('x)"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1402	and at: "at TYPE('x)"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1403	and a: "(pi\<bullet>a)\<sharp>(pi\<bullet>x)"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1404	shows "a\<sharp>x"
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1405	using a by (simp add: pt_fresh_bij[OF pt, OF at])
63e18ed22fda added the lemma pt_fresh_bij2 urbanc parents: 19562 diff changeset	1406
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1407	lemma pt_perm_fresh1:
c35381811d5c Initial revision. berghofe parents: diff changeset	1408	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1409	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1410	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1411	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1412	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1413	and a1: "\<not>(a\<sharp>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1414	and a2: "b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1415	shows "[(a,b)]\<bullet>x \<noteq> x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1416	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	1417	assume neg: "[(a,b)]\<bullet>x = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1418	from a1 have a1':"a\<in>(supp x)" by (simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1419	from a2 have a2':"b\<notin>(supp x)" by (simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1420	from a1' a2' have a3: "a\<noteq>b" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1421	from a1' have "([(a,b)]\<bullet>a)\<in>([(a,b)]\<bullet>(supp x))"
c35381811d5c Initial revision. berghofe parents: diff changeset	1422	by (simp only: pt_set_bij[OF at_pt_inst[OF at], OF at])
19325 35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	1423	hence "b\<in>([(a,b)]\<bullet>(supp x))" by (simp add: at_calc[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1424	hence "b\<in>(supp ([(a,b)]\<bullet>x))" by (simp add: pt_perm_supp[OF pt,OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1425	with a2' neg show False by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1426	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1427
19638 4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1428	(* the next two lemmas are needed in the proof *)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1429	(* of the structural induction principle *)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1430	lemma pt_fresh_aux:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1431	fixes a::"'x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1432	and b::"'x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1433	and c::"'x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1434	and x::"'a"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1435	assumes pt: "pt TYPE('a) TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1436	and at: "at TYPE ('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1437	assumes a1: "c\<noteq>a" and a2: "a\<sharp>x" and a3: "c\<sharp>x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1438	shows "c\<sharp>([(a,b)]\<bullet>x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1439	using a1 a2 a3 by (simp_all add: pt_fresh_left[OF pt, OF at] at_calc[OF at])
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1440
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1441	lemma pt_fresh_aux_ineq:
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1442	fixes pi::"'x prm"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1443	and c::"'y"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1444	and x::"'a"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1445	assumes pta: "pt TYPE('a) TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1446	and ptb: "pt TYPE('y) TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1447	and at: "at TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1448	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1449	and dj: "disjoint TYPE('y) TYPE('x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1450	assumes a: "c\<sharp>x"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1451	shows "c\<sharp>(pi\<bullet>x)"
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1452	using a by (simp add: pt_fresh_left_ineq[OF pta, OF ptb, OF at, OF cp] dj_perm_forget[OF dj])
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	1453
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1454	-- "three helper lemmas for the perm_fresh_fresh-lemma"
c35381811d5c Initial revision. berghofe parents: diff changeset	1455	lemma comprehension_neg_UNIV: "{b. \<not> P b} = UNIV - {b. P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1456	by (auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	1457
c35381811d5c Initial revision. berghofe parents: diff changeset	1458	lemma infinite_or_neg_infinite:
c35381811d5c Initial revision. berghofe parents: diff changeset	1459	assumes h:"infinite (UNIV::'a set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1460	shows "infinite {b::'a. P b} \<or> infinite {b::'a. \<not> P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1461	proof (subst comprehension_neg_UNIV, case_tac "finite {b. P b}")
c35381811d5c Initial revision. berghofe parents: diff changeset	1462	assume j:"finite {b::'a. P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1463	have "infinite ((UNIV::'a set) - {b::'a. P b})"
c35381811d5c Initial revision. berghofe parents: diff changeset	1464	using Diff_infinite_finite[OF j h] by auto
c35381811d5c Initial revision. berghofe parents: diff changeset	1465	thus "infinite {b::'a. P b} \<or> infinite (UNIV - {b::'a. P b})" ..
c35381811d5c Initial revision. berghofe parents: diff changeset	1466	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1467	assume j:"infinite {b::'a. P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1468	thus "infinite {b::'a. P b} \<or> infinite (UNIV - {b::'a. P b})" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1469	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1470
c35381811d5c Initial revision. berghofe parents: diff changeset	1471	--"the co-set of a finite set is infinte"
c35381811d5c Initial revision. berghofe parents: diff changeset	1472	lemma finite_infinite:
c35381811d5c Initial revision. berghofe parents: diff changeset	1473	assumes a: "finite {b::'x. P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1474	and b: "infinite (UNIV::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1475	shows "infinite {b. \<not>P b}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1476	using a and infinite_or_neg_infinite[OF b] by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1477
c35381811d5c Initial revision. berghofe parents: diff changeset	1478	lemma pt_fresh_fresh:
c35381811d5c Initial revision. berghofe parents: diff changeset	1479	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1480	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1481	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1482	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1483	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1484	and a1: "a\<sharp>x" and a2: "b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1485	shows "[(a,b)]\<bullet>x=x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1486	proof (cases "a=b")
19325 35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	1487	assume "a=b"
35177b864f80 tuned some proofs urbanc parents: 19216 diff changeset	1488	hence "[(a,b)] \<triangleq> []" by (simp add: at_ds1[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1489	hence "[(a,b)]\<bullet>x=([]::'x prm)\<bullet>x" by (rule pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1490	thus ?thesis by (simp only: pt1[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1491	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1492	assume c2: "a\<noteq>b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1493	from a1 have f1: "finite {c. [(a,c)]\<bullet>x \<noteq> x}" by (simp add: fresh_def supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1494	from a2 have f2: "finite {c. [(b,c)]\<bullet>x \<noteq> x}" by (simp add: fresh_def supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1495	from f1 and f2 have f3: "finite {c. perm [(a,c)] x \<noteq> x \<or> perm [(b,c)] x \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1496	by (force simp only: Collect_disj_eq)
c35381811d5c Initial revision. berghofe parents: diff changeset	1497	have "infinite {c. [(a,c)]\<bullet>x = x \<and> [(b,c)]\<bullet>x = x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1498	by (simp add: finite_infinite[OF f3,OF at4[OF at], simplified])
c35381811d5c Initial revision. berghofe parents: diff changeset	1499	hence "infinite ({c. [(a,c)]\<bullet>x = x \<and> [(b,c)]\<bullet>x = x}-{a,b})"
c35381811d5c Initial revision. berghofe parents: diff changeset	1500	by (force dest: Diff_infinite_finite)
c35381811d5c Initial revision. berghofe parents: diff changeset	1501	hence "({c. [(a,c)]\<bullet>x = x \<and> [(b,c)]\<bullet>x = x}-{a,b}) \<noteq> {}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1502	by (auto iff del: finite_Diff_insert Diff_eq_empty_iff)
c35381811d5c Initial revision. berghofe parents: diff changeset	1503	hence "\<exists>c. c\<in>({c. [(a,c)]\<bullet>x = x \<and> [(b,c)]\<bullet>x = x}-{a,b})" by (force)
c35381811d5c Initial revision. berghofe parents: diff changeset	1504	then obtain c
c35381811d5c Initial revision. berghofe parents: diff changeset	1505	where eq1: "[(a,c)]\<bullet>x = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1506	and eq2: "[(b,c)]\<bullet>x = x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1507	and ineq: "a\<noteq>c \<and> b\<noteq>c"
c35381811d5c Initial revision. berghofe parents: diff changeset	1508	by (force)
c35381811d5c Initial revision. berghofe parents: diff changeset	1509	hence "[(a,c)]\<bullet>([(b,c)]\<bullet>([(a,c)]\<bullet>x)) = x" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1510	hence eq3: "[(a,c),(b,c),(a,c)]\<bullet>x = x" by (simp add: pt2[OF pt,symmetric])
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	1511	from c2 ineq have "[(a,c),(b,c),(a,c)] \<triangleq> [(a,b)]" by (simp add: at_ds3[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1512	hence "[(a,c),(b,c),(a,c)]\<bullet>x = [(a,b)]\<bullet>x" by (rule pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1513	thus ?thesis using eq3 by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1514	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1515
c35381811d5c Initial revision. berghofe parents: diff changeset	1516	lemma pt_perm_compose:
c35381811d5c Initial revision. berghofe parents: diff changeset	1517	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1518	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1519	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1520	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1521	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1522	shows "pi2\<bullet>(pi1\<bullet>x) = (pi2\<bullet>pi1)\<bullet>(pi2\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1523	proof -
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	1524	have "(pi2@pi1) \<triangleq> ((pi2\<bullet>pi1)@pi2)" by (rule at_ds8)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1525	hence "(pi2@pi1)\<bullet>x = ((pi2\<bullet>pi1)@pi2)\<bullet>x" by (rule pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1526	thus ?thesis by (simp add: pt2[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1527	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1528
19045 75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1529	lemma pt_perm_compose':
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1530	fixes pi1 :: "'x prm"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1531	and pi2 :: "'x prm"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1532	and x :: "'a"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1533	assumes pt: "pt TYPE('a) TYPE('x)"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1534	and at: "at TYPE('x)"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1535	shows "(pi2\<bullet>pi1)\<bullet>x = pi2\<bullet>(pi1\<bullet>((rev pi2)\<bullet>x))"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1536	proof -
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1537	have "pi2\<bullet>(pi1\<bullet>((rev pi2)\<bullet>x)) = (pi2\<bullet>pi1)\<bullet>(pi2\<bullet>((rev pi2)\<bullet>x))"
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1538	by (rule pt_perm_compose[OF pt, OF at])
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1539	also have "\<dots> = (pi2\<bullet>pi1)\<bullet>x" by (simp add: pt_pi_rev[OF pt, OF at])
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1540	finally have "pi2\<bullet>(pi1\<bullet>((rev pi2)\<bullet>x)) = (pi2\<bullet>pi1)\<bullet>x" by simp
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1541	thus ?thesis by simp
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1542	qed
75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1543
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1544	lemma pt_perm_compose_rev:
c35381811d5c Initial revision. berghofe parents: diff changeset	1545	fixes pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1546	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1547	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1548	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1549	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1550	shows "(rev pi2)\<bullet>((rev pi1)\<bullet>x) = (rev pi1)\<bullet>(rev (pi1\<bullet>pi2)\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1551	proof -
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	1552	have "((rev pi2)@(rev pi1)) \<triangleq> ((rev pi1)@(rev (pi1\<bullet>pi2)))" by (rule at_ds9[OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1553	hence "((rev pi2)@(rev pi1))\<bullet>x = ((rev pi1)@(rev (pi1\<bullet>pi2)))\<bullet>x" by (rule pt3[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1554	thus ?thesis by (simp add: pt2[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1555	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1556
c35381811d5c Initial revision. berghofe parents: diff changeset	1557	section {* facts about supports *}
c35381811d5c Initial revision. berghofe parents: diff changeset	1558	(==============================)
c35381811d5c Initial revision. berghofe parents: diff changeset	1559
c35381811d5c Initial revision. berghofe parents: diff changeset	1560	lemma supports_subset:
c35381811d5c Initial revision. berghofe parents: diff changeset	1561	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1562	and S1 :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1563	and S2 :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1564	assumes a: "S1 supports x"
18053 2719a6b7d95e some minor tweaks in some proofs (nothing extraordinary) urbanc parents: 18048 diff changeset	1565	and b: "S1 \<subseteq> S2"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1566	shows "S2 supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1567	using a b
c35381811d5c Initial revision. berghofe parents: diff changeset	1568	by (force simp add: "op supports_def")
c35381811d5c Initial revision. berghofe parents: diff changeset	1569
c35381811d5c Initial revision. berghofe parents: diff changeset	1570	lemma supp_is_subset:
c35381811d5c Initial revision. berghofe parents: diff changeset	1571	fixes S :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1572	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1573	assumes a1: "S supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1574	and a2: "finite S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1575	shows "(supp x)\<subseteq>S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1576	proof (rule ccontr)
c35381811d5c Initial revision. berghofe parents: diff changeset	1577	assume "\<not>(supp x \<subseteq> S)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1578	hence "\<exists>a. a\<in>(supp x) \<and> a\<notin>S" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1579	then obtain a where b1: "a\<in>supp x" and b2: "a\<notin>S" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1580	from a1 b2 have "\<forall>b. (b\<notin>S \<longrightarrow> ([(a,b)]\<bullet>x = x))" by (unfold "op supports_def", force)
19216 a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	1581	hence "{b. [(a,b)]\<bullet>x \<noteq> x}\<subseteq>S" by force
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1582	with a2 have "finite {b. [(a,b)]\<bullet>x \<noteq> x}" by (simp add: finite_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1583	hence "a\<notin>(supp x)" by (unfold supp_def, auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	1584	with b1 show False by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1585	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1586
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1587	lemma supp_supports:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1588	fixes x :: "'a"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1589	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1590	and at: "at TYPE ('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1591	shows "((supp x)::'x set) supports x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1592	proof (unfold "op supports_def", intro strip)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1593	fix a b
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1594	assume "(a::'x)\<notin>(supp x) \<and> (b::'x)\<notin>(supp x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1595	hence "a\<sharp>x" and "b\<sharp>x" by (auto simp add: fresh_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1596	thus "[(a,b)]\<bullet>x = x" by (rule pt_fresh_fresh[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1597	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1598
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1599	lemma supports_finite:
c35381811d5c Initial revision. berghofe parents: diff changeset	1600	fixes S :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1601	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1602	assumes a1: "S supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1603	and a2: "finite S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1604	shows "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1605	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1606	have "(supp x)\<subseteq>S" using a1 a2 by (rule supp_is_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1607	thus ?thesis using a2 by (simp add: finite_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1608	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1609
c35381811d5c Initial revision. berghofe parents: diff changeset	1610	lemma supp_is_inter:
c35381811d5c Initial revision. berghofe parents: diff changeset	1611	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1612	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1613	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1614	and fs: "fs TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1615	shows "((supp x)::'x set) = (\<Inter> {S. finite S \<and> S supports x})"
c35381811d5c Initial revision. berghofe parents: diff changeset	1616	proof (rule equalityI)
c35381811d5c Initial revision. berghofe parents: diff changeset	1617	show "((supp x)::'x set) \<subseteq> (\<Inter> {S. finite S \<and> S supports x})"
c35381811d5c Initial revision. berghofe parents: diff changeset	1618	proof (clarify)
c35381811d5c Initial revision. berghofe parents: diff changeset	1619	fix S c
c35381811d5c Initial revision. berghofe parents: diff changeset	1620	assume b: "c\<in>((supp x)::'x set)" and "finite (S::'x set)" and "S supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1621	hence "((supp x)::'x set)\<subseteq>S" by (simp add: supp_is_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1622	with b show "c\<in>S" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1623	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1624	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1625	show "(\<Inter> {S. finite S \<and> S supports x}) \<subseteq> ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1626	proof (clarify, simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	1627	fix c
c35381811d5c Initial revision. berghofe parents: diff changeset	1628	assume d: "\<forall>(S::'x set). finite S \<and> S supports x \<longrightarrow> c\<in>S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1629	have "((supp x)::'x set) supports x" by (rule supp_supports[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1630	with d fs1[OF fs] show "c\<in>supp x" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1631	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1632	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1633
c35381811d5c Initial revision. berghofe parents: diff changeset	1634	lemma supp_is_least_supports:
c35381811d5c Initial revision. berghofe parents: diff changeset	1635	fixes S :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1636	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1637	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1638	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1639	and a1: "S supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1640	and a2: "finite S"
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1641	and a3: "\<forall>S'. (S' supports x) \<longrightarrow> S\<subseteq>S'"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1642	shows "S = (supp x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1643	proof (rule equalityI)
c35381811d5c Initial revision. berghofe parents: diff changeset	1644	show "((supp x)::'x set)\<subseteq>S" using a1 a2 by (rule supp_is_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1645	next
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1646	have "((supp x)::'x set) supports x" by (rule supp_supports[OF pt, OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1647	with a3 show "S\<subseteq>supp x" by force
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1648	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1649
c35381811d5c Initial revision. berghofe parents: diff changeset	1650	lemma supports_set:
c35381811d5c Initial revision. berghofe parents: diff changeset	1651	fixes S :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1652	and X :: "'a set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1653	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1654	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1655	and a: "\<forall>x\<in>X. (\<forall>(a::'x) (b::'x). a\<notin>S\<and>b\<notin>S \<longrightarrow> ([(a,b)]\<bullet>x)\<in>X)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1656	shows "S supports X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1657	using a
c35381811d5c Initial revision. berghofe parents: diff changeset	1658	apply(auto simp add: "op supports_def")
c35381811d5c Initial revision. berghofe parents: diff changeset	1659	apply(simp add: pt_set_bij1a[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1660	apply(force simp add: pt_swap_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1661	apply(simp add: pt_set_bij1a[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1662	done
c35381811d5c Initial revision. berghofe parents: diff changeset	1663
c35381811d5c Initial revision. berghofe parents: diff changeset	1664	lemma supports_fresh:
c35381811d5c Initial revision. berghofe parents: diff changeset	1665	fixes S :: "'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1666	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1667	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1668	assumes a1: "S supports x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1669	and a2: "finite S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1670	and a3: "a\<notin>S"
c35381811d5c Initial revision. berghofe parents: diff changeset	1671	shows "a\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1672	proof (simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1673	have "(supp x)\<subseteq>S" using a1 a2 by (rule supp_is_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1674	thus "a\<notin>(supp x)" using a3 by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1675	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1676
c35381811d5c Initial revision. berghofe parents: diff changeset	1677	lemma at_fin_set_supports:
c35381811d5c Initial revision. berghofe parents: diff changeset	1678	fixes X::"'x set"
c35381811d5c Initial revision. berghofe parents: diff changeset	1679	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1680	shows "X supports X"
19329 d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1681	proof -
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1682	have "\<forall>a b. a\<notin>X \<and> b\<notin>X \<longrightarrow> [(a,b)]\<bullet>X = X" by (auto simp add: perm_set_def at_calc[OF at])
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1683	then show ?thesis by (simp add: "op supports_def")
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1684	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1685
19329 d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1686	lemma infinite_Collection:
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1687	assumes a1:"infinite X"
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1688	and a2:"\<forall>b\<in>X. P(b)"
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1689	shows "infinite {b\<in>X. P(b)}"
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1690	using a1 a2
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1691	apply auto
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1692	apply (subgoal_tac "infinite (X - {b\<in>X. P b})")
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1693	apply (simp add: set_diff_def)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1694	apply (simp add: Diff_infinite_finite)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1695	done
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1696
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1697	lemma at_fin_set_supp:
19329 d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1698	fixes X::"'x set"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1699	assumes at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1700	and fs: "finite X"
c35381811d5c Initial revision. berghofe parents: diff changeset	1701	shows "(supp X) = X"
19329 d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1702	proof (rule subset_antisym)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1703	show "(supp X) \<subseteq> X" using at_fin_set_supports[OF at] using fs by (simp add: supp_is_subset)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1704	next
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1705	have inf: "infinite (UNIV-X)" using at4[OF at] fs by (auto simp add: Diff_infinite_finite)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1706	{ fix a::"'x"
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1707	assume asm: "a\<in>X"
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1708	hence "\<forall>b\<in>(UNIV-X). [(a,b)]\<bullet>X\<noteq>X" by (auto simp add: perm_set_def at_calc[OF at])
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1709	with inf have "infinite {b\<in>(UNIV-X). [(a,b)]\<bullet>X\<noteq>X}" by (rule infinite_Collection)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1710	hence "infinite {b. [(a,b)]\<bullet>X\<noteq>X}" by (rule_tac infinite_super, auto)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1711	hence "a\<in>(supp X)" by (simp add: supp_def)
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1712	}
d6ddf304ec24 simplified the proof at_fin_set_supp urbanc parents: 19325 diff changeset	1713	then show "X\<subseteq>(supp X)" by blast
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1714	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1715
c35381811d5c Initial revision. berghofe parents: diff changeset	1716	section {* Permutations acting on Functions *}
c35381811d5c Initial revision. berghofe parents: diff changeset	1717	(==========================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	1718
c35381811d5c Initial revision. berghofe parents: diff changeset	1719	lemma pt_fun_app_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1720	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1721	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1722	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1723	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1724	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1725	shows "pi\<bullet>(f x) = (pi\<bullet>f)(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1726	by (simp add: perm_fun_def pt_rev_pi[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1727
c35381811d5c Initial revision. berghofe parents: diff changeset	1728
19045 75786c2eb897 added lemma pt_perm_compose' urbanc parents: 18745 diff changeset	1729	--"sometimes pt_fun_app_eq does too much; this lemma 'corrects it'"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1730	lemma pt_perm:
c35381811d5c Initial revision. berghofe parents: diff changeset	1731	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1732	and pi1 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1733	and pi2 :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1734	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1735	and at: "at TYPE ('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1736	shows "(pi1\<bullet>perm pi2)(pi1\<bullet>x) = pi1\<bullet>(pi2\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1737	by (simp add: pt_fun_app_eq[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1738
c35381811d5c Initial revision. berghofe parents: diff changeset	1739
c35381811d5c Initial revision. berghofe parents: diff changeset	1740	lemma pt_fun_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1741	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1742	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1743	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1744	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1745	shows "(pi\<bullet>f = f) = (\<forall> x. pi\<bullet>(f x) = f (pi\<bullet>x))" (is "?LHS = ?RHS")
c35381811d5c Initial revision. berghofe parents: diff changeset	1746	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	1747	assume a: "?LHS"
c35381811d5c Initial revision. berghofe parents: diff changeset	1748	show "?RHS"
c35381811d5c Initial revision. berghofe parents: diff changeset	1749	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	1750	fix x
c35381811d5c Initial revision. berghofe parents: diff changeset	1751	have "pi\<bullet>(f x) = (pi\<bullet>f)(pi\<bullet>x)" by (simp add: pt_fun_app_eq[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1752	also have "\<dots> = f (pi\<bullet>x)" using a by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1753	finally show "pi\<bullet>(f x) = f (pi\<bullet>x)" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1754	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1755	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1756	assume b: "?RHS"
c35381811d5c Initial revision. berghofe parents: diff changeset	1757	show "?LHS"
c35381811d5c Initial revision. berghofe parents: diff changeset	1758	proof (rule ccontr)
c35381811d5c Initial revision. berghofe parents: diff changeset	1759	assume "(pi\<bullet>f) \<noteq> f"
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1760	hence "\<exists>x. (pi\<bullet>f) x \<noteq> f x" by (simp add: expand_fun_eq)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1761	then obtain x where b1: "(pi\<bullet>f) x \<noteq> f x" by force
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1762	from b have "pi\<bullet>(f ((rev pi)\<bullet>x)) = f (pi\<bullet>((rev pi)\<bullet>x))" by force
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1763	hence "(pi\<bullet>f)(pi\<bullet>((rev pi)\<bullet>x)) = f (pi\<bullet>((rev pi)\<bullet>x))"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1764	by (simp add: pt_fun_app_eq[OF pt, OF at])
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	1765	hence "(pi\<bullet>f) x = f x" by (simp add: pt_pi_rev[OF pt, OF at])
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1766	with b1 show "False" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1767	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1768	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1769
c35381811d5c Initial revision. berghofe parents: diff changeset	1770	-- "two helper lemmas for the equivariance of functions"
c35381811d5c Initial revision. berghofe parents: diff changeset	1771	lemma pt_swap_eq_aux:
c35381811d5c Initial revision. berghofe parents: diff changeset	1772	fixes y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1773	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	1774	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1775	and a: "\<forall>(a::'x) (b::'x). [(a,b)]\<bullet>y = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1776	shows "pi\<bullet>y = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1777	proof(induct pi)
c35381811d5c Initial revision. berghofe parents: diff changeset	1778	case Nil show ?case by (simp add: pt1[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1779	next
c35381811d5c Initial revision. berghofe parents: diff changeset	1780	case (Cons x xs)
c35381811d5c Initial revision. berghofe parents: diff changeset	1781	have "\<exists>a b. x=(a,b)" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1782	then obtain a b where p: "x=(a,b)" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1783	assume i: "xs\<bullet>y = y"
c35381811d5c Initial revision. berghofe parents: diff changeset	1784	have "x#xs = [x]@xs" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1785	hence "(x#xs)\<bullet>y = ([x]@xs)\<bullet>y" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1786	hence "(x#xs)\<bullet>y = [x]\<bullet>(xs\<bullet>y)" by (simp only: pt2[OF pt])
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1787	thus ?case using a i p by force
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	1788	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1789
c35381811d5c Initial revision. berghofe parents: diff changeset	1790	lemma pt_swap_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	1791	fixes y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	1792	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1793	shows "(\<forall>(a::'x) (b::'x). [(a,b)]\<bullet>y = y) = (\<forall>pi::'x prm. pi\<bullet>y = y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1794	by (force intro: pt_swap_eq_aux[OF pt])
c35381811d5c Initial revision. berghofe parents: diff changeset	1795
c35381811d5c Initial revision. berghofe parents: diff changeset	1796	lemma pt_eqvt_fun1a:
c35381811d5c Initial revision. berghofe parents: diff changeset	1797	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1798	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1799	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1800	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1801	and a: "((supp f)::'x set)={}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1802	shows "\<forall>(pi::'x prm). pi\<bullet>f = f"
c35381811d5c Initial revision. berghofe parents: diff changeset	1803	proof (intro strip)
c35381811d5c Initial revision. berghofe parents: diff changeset	1804	fix pi
c35381811d5c Initial revision. berghofe parents: diff changeset	1805	have "\<forall>a b. a\<notin>((supp f)::'x set) \<and> b\<notin>((supp f)::'x set) \<longrightarrow> (([(a,b)]\<bullet>f) = f)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1806	by (intro strip, fold fresh_def,
c35381811d5c Initial revision. berghofe parents: diff changeset	1807	simp add: pt_fresh_fresh[OF pt_fun_inst[OF pta, OF ptb, OF at],OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1808	with a have "\<forall>(a::'x) (b::'x). ([(a,b)]\<bullet>f) = f" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1809	hence "\<forall>(pi::'x prm). pi\<bullet>f = f"
c35381811d5c Initial revision. berghofe parents: diff changeset	1810	by (simp add: pt_swap_eq[OF pt_fun_inst[OF pta, OF ptb, OF at]])
c35381811d5c Initial revision. berghofe parents: diff changeset	1811	thus "(pi::'x prm)\<bullet>f = f" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	1812	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1813
c35381811d5c Initial revision. berghofe parents: diff changeset	1814	lemma pt_eqvt_fun1b:
c35381811d5c Initial revision. berghofe parents: diff changeset	1815	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1816	assumes a: "\<forall>(pi::'x prm). pi\<bullet>f = f"
c35381811d5c Initial revision. berghofe parents: diff changeset	1817	shows "((supp f)::'x set)={}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1818	using a by (simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1819
c35381811d5c Initial revision. berghofe parents: diff changeset	1820	lemma pt_eqvt_fun1:
c35381811d5c Initial revision. berghofe parents: diff changeset	1821	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1822	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1823	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1824	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1825	shows "(((supp f)::'x set)={}) = (\<forall>(pi::'x prm). pi\<bullet>f = f)" (is "?LHS = ?RHS")
c35381811d5c Initial revision. berghofe parents: diff changeset	1826	by (rule iffI, simp add: pt_eqvt_fun1a[OF pta, OF ptb, OF at], simp add: pt_eqvt_fun1b)
c35381811d5c Initial revision. berghofe parents: diff changeset	1827
c35381811d5c Initial revision. berghofe parents: diff changeset	1828	lemma pt_eqvt_fun2a:
c35381811d5c Initial revision. berghofe parents: diff changeset	1829	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1830	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1831	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1832	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1833	assumes a: "((supp f)::'x set)={}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1834	shows "\<forall>(pi::'x prm) (x::'a). pi\<bullet>(f x) = f(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1835	proof (intro strip)
c35381811d5c Initial revision. berghofe parents: diff changeset	1836	fix pi x
c35381811d5c Initial revision. berghofe parents: diff changeset	1837	from a have b: "\<forall>(pi::'x prm). pi\<bullet>f = f" by (simp add: pt_eqvt_fun1[OF pta, OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1838	have "(pi::'x prm)\<bullet>(f x) = (pi\<bullet>f)(pi\<bullet>x)" by (simp add: pt_fun_app_eq[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1839	with b show "(pi::'x prm)\<bullet>(f x) = f (pi\<bullet>x)" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1840	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1841
c35381811d5c Initial revision. berghofe parents: diff changeset	1842	lemma pt_eqvt_fun2b:
c35381811d5c Initial revision. berghofe parents: diff changeset	1843	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1844	assumes pt1: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1845	and pt2: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1846	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1847	assumes a: "\<forall>(pi::'x prm) (x::'a). pi\<bullet>(f x) = f(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1848	shows "((supp f)::'x set)={}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1849	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1850	from a have "\<forall>(pi::'x prm). pi\<bullet>f = f" by (simp add: pt_fun_eq[OF pt1, OF at, symmetric])
c35381811d5c Initial revision. berghofe parents: diff changeset	1851	thus ?thesis by (simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	1852	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1853
c35381811d5c Initial revision. berghofe parents: diff changeset	1854	lemma pt_eqvt_fun2:
c35381811d5c Initial revision. berghofe parents: diff changeset	1855	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1856	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1857	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1858	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1859	shows "(((supp f)::'x set)={}) = (\<forall>(pi::'x prm) (x::'a). pi\<bullet>(f x) = f(pi\<bullet>x))"
c35381811d5c Initial revision. berghofe parents: diff changeset	1860	by (rule iffI,
c35381811d5c Initial revision. berghofe parents: diff changeset	1861	simp add: pt_eqvt_fun2a[OF pta, OF ptb, OF at],
c35381811d5c Initial revision. berghofe parents: diff changeset	1862	simp add: pt_eqvt_fun2b[OF pta, OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1863
c35381811d5c Initial revision. berghofe parents: diff changeset	1864	lemma pt_supp_fun_subset:
c35381811d5c Initial revision. berghofe parents: diff changeset	1865	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1866	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1867	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1868	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1869	and f1: "finite ((supp f)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1870	and f2: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1871	shows "supp (f x) \<subseteq> (((supp f)\<union>(supp x))::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1872	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	1873	have s1: "((supp f)\<union>((supp x)::'x set)) supports (f x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1874	proof (simp add: "op supports_def", fold fresh_def, auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	1875	fix a::"'x" and b::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1876	assume "a\<sharp>f" and "b\<sharp>f"
c35381811d5c Initial revision. berghofe parents: diff changeset	1877	hence a1: "[(a,b)]\<bullet>f = f"
c35381811d5c Initial revision. berghofe parents: diff changeset	1878	by (rule pt_fresh_fresh[OF pt_fun_inst[OF pta, OF ptb, OF at], OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1879	assume "a\<sharp>x" and "b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1880	hence a2: "[(a,b)]\<bullet>x = x" by (rule pt_fresh_fresh[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1881	from a1 a2 show "[(a,b)]\<bullet>(f x) = (f x)" by (simp add: pt_fun_app_eq[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1882	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1883	from f1 f2 have "finite ((supp f)\<union>((supp x)::'x set))" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1884	with s1 show ?thesis by (rule supp_is_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1885	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1886
c35381811d5c Initial revision. berghofe parents: diff changeset	1887	lemma pt_empty_supp_fun_subset:
c35381811d5c Initial revision. berghofe parents: diff changeset	1888	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	1889	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1890	and ptb: "pt TYPE('b) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1891	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1892	and e: "(supp f)=({}::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1893	shows "supp (f x) \<subseteq> ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	1894	proof (unfold supp_def, auto)
c35381811d5c Initial revision. berghofe parents: diff changeset	1895	fix a::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	1896	assume a1: "finite {b. [(a, b)]\<bullet>x \<noteq> x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1897	assume "infinite {b. [(a, b)]\<bullet>(f x) \<noteq> f x}"
c35381811d5c Initial revision. berghofe parents: diff changeset	1898	hence a2: "infinite {b. f ([(a, b)]\<bullet>x) \<noteq> f x}" using e
c35381811d5c Initial revision. berghofe parents: diff changeset	1899	by (simp add: pt_eqvt_fun2[OF pta, OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	1900	have a3: "{b. f ([(a,b)]\<bullet>x) \<noteq> f x}\<subseteq>{b. [(a,b)]\<bullet>x \<noteq> x}" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	1901	from a1 a2 a3 show False by (force dest: finite_subset)
c35381811d5c Initial revision. berghofe parents: diff changeset	1902	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	1903
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1904	section {* Facts about the support of finite sets of finitely supported things *}
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1905	(=============================================================================)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1906
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1907	constdefs
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1908	X_to_Un_supp :: "('a set) \<Rightarrow> 'x set"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1909	"X_to_Un_supp X \<equiv> \<Union>x\<in>X. ((supp x)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1910
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1911	lemma UNION_f_eqvt:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1912	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1913	and f::"'a \<Rightarrow> 'x set"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1914	and pi::"'x prm"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1915	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1916	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1917	shows "pi\<bullet>(\<Union>x\<in>X. f x) = (\<Union>x\<in>(pi\<bullet>X). (pi\<bullet>f) x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1918	proof -
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1919	have pt_x: "pt TYPE('x) TYPE('x)" by (force intro: at_pt_inst at)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1920	show ?thesis
18351 6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1921	proof (rule equalityI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1922	case goal1
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1923	show "pi\<bullet>(\<Union>x\<in>X. f x) \<subseteq> (\<Union>x\<in>(pi\<bullet>X). (pi\<bullet>f) x)"
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1924	apply(auto simp add: perm_set_def)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1925	apply(rule_tac x="pi\<bullet>xa" in exI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1926	apply(rule conjI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1927	apply(rule_tac x="xa" in exI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1928	apply(simp)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1929	apply(subgoal_tac "(pi\<bullet>f) (pi\<bullet>xa) = pi\<bullet>(f xa)")(A)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1930	apply(simp)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1931	apply(rule pt_set_bij2[OF pt_x, OF at])
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1932	apply(assumption)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1933	(A)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1934	apply(rule sym)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1935	apply(rule pt_fun_app_eq[OF pt, OF at])
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1936	done
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1937	next
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1938	case goal2
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1939	show "(\<Union>x\<in>(pi\<bullet>X). (pi\<bullet>f) x) \<subseteq> pi\<bullet>(\<Union>x\<in>X. f x)"
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1940	apply(auto simp add: perm_set_def)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1941	apply(rule_tac x="(rev pi)\<bullet>x" in exI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1942	apply(rule conjI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1943	apply(simp add: pt_pi_rev[OF pt_x, OF at])
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1944	apply(rule_tac x="a" in bexI)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1945	apply(simp add: pt_set_bij1[OF pt_x, OF at])
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1946	apply(simp add: pt_fun_app_eq[OF pt, OF at])
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1947	apply(assumption)
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1948	done
6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	1949	qed
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1950	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1951
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1952	lemma X_to_Un_supp_eqvt:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1953	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1954	and pi::"'x prm"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1955	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1956	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1957	shows "pi\<bullet>(X_to_Un_supp X) = ((X_to_Un_supp (pi\<bullet>X))::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1958	apply(simp add: X_to_Un_supp_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1959	apply(simp add: UNION_f_eqvt[OF pt, OF at] perm_fun_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1960	apply(simp add: pt_perm_supp[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1961	apply(simp add: pt_pi_rev[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1962	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1963
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1964	lemma Union_supports_set:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1965	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1966	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1967	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1968	shows "(\<Union>x\<in>X. ((supp x)::'x set)) supports X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1969	apply(simp add: "op supports_def" fresh_def[symmetric])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1970	apply(rule allI)+
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1971	apply(rule impI)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1972	apply(erule conjE)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1973	apply(simp add: perm_set_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1974	apply(auto)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1975	apply(subgoal_tac "[(a,b)]\<bullet>aa = aa")(A)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1976	apply(simp)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1977	apply(rule pt_fresh_fresh[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1978	apply(force)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1979	apply(force)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1980	apply(rule_tac x="x" in exI)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1981	apply(simp)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1982	apply(rule sym)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1983	apply(rule pt_fresh_fresh[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1984	apply(force)+
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1985	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1986
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1987	lemma Union_of_fin_supp_sets:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1988	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1989	assumes fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1990	and fi: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1991	shows "finite (\<Union>x\<in>X. ((supp x)::'x set))"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1992	using fi by (induct, auto simp add: fs1[OF fs])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1993
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1994	lemma Union_included_in_supp:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1995	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1996	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1997	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1998	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	1999	and fi: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2000	shows "(\<Union>x\<in>X. ((supp x)::'x set)) \<subseteq> supp X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2001	proof -
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2002	have "supp ((X_to_Un_supp X)::'x set) \<subseteq> ((supp X)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2003	apply(rule pt_empty_supp_fun_subset)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2004	apply(force intro: pt_set_inst at_pt_inst pt at)+
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2005	apply(rule pt_eqvt_fun2b)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2006	apply(force intro: pt_set_inst at_pt_inst pt at)+
18351 6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	2007	apply(rule allI)+
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2008	apply(rule X_to_Un_supp_eqvt[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2009	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2010	hence "supp (\<Union>x\<in>X. ((supp x)::'x set)) \<subseteq> ((supp X)::'x set)" by (simp add: X_to_Un_supp_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2011	moreover
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2012	have "supp (\<Union>x\<in>X. ((supp x)::'x set)) = (\<Union>x\<in>X. ((supp x)::'x set))"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2013	apply(rule at_fin_set_supp[OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2014	apply(rule Union_of_fin_supp_sets[OF fs, OF fi])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2015	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2016	ultimately show ?thesis by force
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2017	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2018
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2019	lemma supp_of_fin_sets:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2020	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2021	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2022	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2023	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2024	and fi: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2025	shows "(supp X) = (\<Union>x\<in>X. ((supp x)::'x set))"
18351 6bab9cef50cf ISAR-fied two proofs urbanc parents: 18295 diff changeset	2026	apply(rule equalityI)
18264 3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2027	apply(rule supp_is_subset)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2028	apply(rule Union_supports_set[OF pt, OF at])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2029	apply(rule Union_of_fin_supp_sets[OF fs, OF fi])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2030	apply(rule Union_included_in_supp[OF pt, OF at, OF fs, OF fi])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2031	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2032
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2033	lemma supp_fin_union:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2034	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2035	and Y::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2036	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2037	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2038	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2039	and f1: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2040	and f2: "finite Y"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2041	shows "(supp (X\<union>Y)) = (supp X)\<union>((supp Y)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2042	using f1 f2 by (force simp add: supp_of_fin_sets[OF pt, OF at, OF fs])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2043
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2044	lemma supp_fin_insert:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2045	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2046	and x::"'a"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2047	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2048	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2049	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2050	and f: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2051	shows "(supp (insert x X)) = (supp x)\<union>((supp X)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2052	proof -
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2053	have "(supp (insert x X)) = ((supp ({x}\<union>(X::'a set)))::'x set)" by simp
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2054	also have "\<dots> = (supp {x})\<union>(supp X)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2055	by (rule supp_fin_union[OF pt, OF at, OF fs], simp_all add: f)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2056	finally show "(supp (insert x X)) = (supp x)\<union>((supp X)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2057	by (simp add: supp_singleton)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2058	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2059
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2060	lemma fresh_fin_union:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2061	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2062	and Y::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2063	and a::"'x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2064	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2065	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2066	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2067	and f1: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2068	and f2: "finite Y"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2069	shows "a\<sharp>(X\<union>Y) = (a\<sharp>X \<and> a\<sharp>Y)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2070	apply(simp add: fresh_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2071	apply(simp add: supp_fin_union[OF pt, OF at, OF fs, OF f1, OF f2])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2072	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2073
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2074	lemma fresh_fin_insert:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2075	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2076	and x::"'a"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2077	and a::"'x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2078	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2079	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2080	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2081	and f: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2082	shows "a\<sharp>(insert x X) = (a\<sharp>x \<and> a\<sharp>X)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2083	apply(simp add: fresh_def)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2084	apply(simp add: supp_fin_insert[OF pt, OF at, OF fs, OF f])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2085	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2086
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2087	lemma fresh_fin_insert1:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2088	fixes X::"('a set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2089	and x::"'a"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2090	and a::"'x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2091	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2092	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2093	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2094	and f: "finite X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2095	and a1: "a\<sharp>x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2096	and a2: "a\<sharp>X"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2097	shows "a\<sharp>(insert x X)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2098	using a1 a2
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2099	apply(simp add: fresh_fin_insert[OF pt, OF at, OF fs, OF f])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2100	done
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2101
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2102	lemma pt_list_set_pi:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2103	fixes pi :: "'x prm"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2104	and xs :: "'a list"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2105	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2106	shows "pi\<bullet>(set xs) = set (pi\<bullet>xs)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2107	by (induct xs, auto simp add: perm_set_def pt1[OF pt])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2108
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2109	lemma pt_list_set_supp:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2110	fixes xs :: "'a list"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2111	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2112	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2113	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2114	shows "supp (set xs) = ((supp xs)::'x set)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2115	proof -
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2116	have "supp (set xs) = (\<Union>x\<in>(set xs). ((supp x)::'x set))"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2117	by (rule supp_of_fin_sets[OF pt, OF at, OF fs], rule finite_set)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2118	also have "(\<Union>x\<in>(set xs). ((supp x)::'x set)) = (supp xs)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2119	proof(induct xs)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2120	case Nil show ?case by (simp add: supp_list_nil)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2121	next
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2122	case (Cons h t) thus ?case by (simp add: supp_list_cons)
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2123	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2124	finally show ?thesis by simp
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2125	qed
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2126
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2127	lemma pt_list_set_fresh:
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2128	fixes a :: "'x"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2129	and xs :: "'a list"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2130	assumes pt: "pt TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2131	and at: "at TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2132	and fs: "fs TYPE('a) TYPE('x)"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2133	and a: "a\<sharp>xs"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2134	shows "a\<sharp>(set xs) = a\<sharp>xs"
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2135	by (simp add: fresh_def pt_list_set_supp[OF pt, OF at, OF fs])
3b808e24667b added the version of nominal.thy that contains urbanc parents: 18246 diff changeset	2136
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2137	section {* composition instances *}
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2138	(* ============================= *)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2139
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2140	lemma cp_list_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2141	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2142	shows "cp TYPE ('a list) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2143	using c1
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2144	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2145	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2146	apply(induct_tac x)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2147	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2148	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2149
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2150	lemma cp_set_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2151	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2152	shows "cp TYPE ('a set) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2153	using c1
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2154	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2155	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2156	apply(auto simp add: perm_set_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2157	apply(rule_tac x="pi2\<bullet>aa" in exI)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2158	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2159	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2160
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2161	lemma cp_option_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2162	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2163	shows "cp TYPE ('a option) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2164	using c1
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2165	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2166	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2167	apply(case_tac x)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2168	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2169	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2170
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2171	lemma cp_noption_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2172	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2173	shows "cp TYPE ('a noption) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2174	using c1
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2175	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2176	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2177	apply(case_tac x)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2178	apply(auto)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2179	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2180
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2181	lemma cp_unit_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2182	shows "cp TYPE (unit) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2183	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2184	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2185
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2186	lemma cp_bool_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2187	shows "cp TYPE (bool) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2188	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2189	apply(rule allI)+
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2190	apply(induct_tac x)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2191	apply(simp_all)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2192	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2193
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2194	lemma cp_prod_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2195	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2196	and c2: "cp TYPE ('b) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2197	shows "cp TYPE ('a\<times>'b) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2198	using c1 c2
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2199	apply(simp add: cp_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2200	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2201
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2202	lemma cp_fun_inst:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2203	assumes c1: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2204	and c2: "cp TYPE ('b) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2205	and pt: "pt TYPE ('y) TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2206	and at: "at TYPE ('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2207	shows "cp TYPE ('a\<Rightarrow>'b) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2208	using c1 c2
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2209	apply(auto simp add: cp_def perm_fun_def expand_fun_eq)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2210	apply(simp add: perm_rev[symmetric])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2211	apply(simp add: pt_rev_pi[OF pt_list_inst[OF pt_prod_inst[OF pt, OF pt]], OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2212	done
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2213
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2214
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2215	section {* Andy's freshness lemma *}
c35381811d5c Initial revision. berghofe parents: diff changeset	2216	(================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	2217
c35381811d5c Initial revision. berghofe parents: diff changeset	2218	lemma freshness_lemma:
c35381811d5c Initial revision. berghofe parents: diff changeset	2219	fixes h :: "'x\<Rightarrow>'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2220	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2221	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2222	and f1: "finite ((supp h)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2223	and a: "\<exists>a::'x. (a\<sharp>h \<and> a\<sharp>(h a))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2224	shows "\<exists>fr::'a. \<forall>a::'x. a\<sharp>h \<longrightarrow> (h a) = fr"
c35381811d5c Initial revision. berghofe parents: diff changeset	2225	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2226	have ptb: "pt TYPE('x) TYPE('x)" by (simp add: at_pt_inst[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2227	have ptc: "pt TYPE('x\<Rightarrow>'a) TYPE('x)" by (simp add: pt_fun_inst[OF ptb, OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2228	from a obtain a0 where a1: "a0\<sharp>h" and a2: "a0\<sharp>(h a0)" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2229	show ?thesis
c35381811d5c Initial revision. berghofe parents: diff changeset	2230	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	2231	let ?fr = "h (a0::'x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2232	show "\<forall>(a::'x). (a\<sharp>h \<longrightarrow> ((h a) = ?fr))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2233	proof (intro strip)
c35381811d5c Initial revision. berghofe parents: diff changeset	2234	fix a
c35381811d5c Initial revision. berghofe parents: diff changeset	2235	assume a3: "(a::'x)\<sharp>h"
c35381811d5c Initial revision. berghofe parents: diff changeset	2236	show "h (a::'x) = h a0"
c35381811d5c Initial revision. berghofe parents: diff changeset	2237	proof (cases "a=a0")
c35381811d5c Initial revision. berghofe parents: diff changeset	2238	case True thus "h (a::'x) = h a0" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2239	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2240	case False
c35381811d5c Initial revision. berghofe parents: diff changeset	2241	assume "a\<noteq>a0"
c35381811d5c Initial revision. berghofe parents: diff changeset	2242	hence c1: "a\<notin>((supp a0)::'x set)" by (simp add: fresh_def[symmetric] at_fresh[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2243	have c2: "a\<notin>((supp h)::'x set)" using a3 by (simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	2244	from c1 c2 have c3: "a\<notin>((supp h)\<union>((supp a0)::'x set))" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2245	have f2: "finite ((supp a0)::'x set)" by (simp add: at_supp[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2246	from f1 f2 have "((supp (h a0))::'x set)\<subseteq>((supp h)\<union>(supp a0))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2247	by (simp add: pt_supp_fun_subset[OF ptb, OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2248	hence "a\<notin>((supp (h a0))::'x set)" using c3 by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2249	hence "a\<sharp>(h a0)" by (simp add: fresh_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	2250	with a2 have d1: "[(a0,a)]\<bullet>(h a0) = (h a0)" by (rule pt_fresh_fresh[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2251	from a1 a3 have d2: "[(a0,a)]\<bullet>h = h" by (rule pt_fresh_fresh[OF ptc, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2252	from d1 have "h a0 = [(a0,a)]\<bullet>(h a0)" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2253	also have "\<dots>= ([(a0,a)]\<bullet>h)([(a0,a)]\<bullet>a0)" by (simp add: pt_fun_app_eq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2254	also have "\<dots> = h ([(a0,a)]\<bullet>a0)" using d2 by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2255	also have "\<dots> = h a" by (simp add: at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2256	finally show "h a = h a0" by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2257	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2258	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2259	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2260	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2261
c35381811d5c Initial revision. berghofe parents: diff changeset	2262	lemma freshness_lemma_unique:
c35381811d5c Initial revision. berghofe parents: diff changeset	2263	fixes h :: "'x\<Rightarrow>'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2264	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2265	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2266	and f1: "finite ((supp h)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2267	and a: "\<exists>(a::'x). (a\<sharp>h \<and> a\<sharp>(h a))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2268	shows "\<exists>!(fr::'a). \<forall>(a::'x). a\<sharp>h \<longrightarrow> (h a) = fr"
18703 13e11abcfc96 fixed one proof that broke because of the changes urbanc parents: 18657 diff changeset	2269	proof (rule ex_ex1I)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2270	from pt at f1 a show "\<exists>fr::'a. \<forall>a::'x. a\<sharp>h \<longrightarrow> h a = fr" by (simp add: freshness_lemma)
c35381811d5c Initial revision. berghofe parents: diff changeset	2271	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2272	fix fr1 fr2
c35381811d5c Initial revision. berghofe parents: diff changeset	2273	assume b1: "\<forall>a::'x. a\<sharp>h \<longrightarrow> h a = fr1"
c35381811d5c Initial revision. berghofe parents: diff changeset	2274	assume b2: "\<forall>a::'x. a\<sharp>h \<longrightarrow> h a = fr2"
c35381811d5c Initial revision. berghofe parents: diff changeset	2275	from a obtain a where "(a::'x)\<sharp>h" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2276	with b1 b2 have "h a = fr1 \<and> h a = fr2" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2277	thus "fr1 = fr2" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2278	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2279
c35381811d5c Initial revision. berghofe parents: diff changeset	2280	-- "packaging the freshness lemma into a function"
c35381811d5c Initial revision. berghofe parents: diff changeset	2281	constdefs
c35381811d5c Initial revision. berghofe parents: diff changeset	2282	fresh_fun :: "('x\<Rightarrow>'a)\<Rightarrow>'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2283	"fresh_fun (h) \<equiv> THE fr. (\<forall>(a::'x). a\<sharp>h \<longrightarrow> (h a) = fr)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2284
c35381811d5c Initial revision. berghofe parents: diff changeset	2285	lemma fresh_fun_app:
c35381811d5c Initial revision. berghofe parents: diff changeset	2286	fixes h :: "'x\<Rightarrow>'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2287	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2288	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2289	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2290	and f1: "finite ((supp h)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2291	and a: "\<exists>(a::'x). (a\<sharp>h \<and> a\<sharp>(h a))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2292	and b: "a\<sharp>h"
c35381811d5c Initial revision. berghofe parents: diff changeset	2293	shows "(fresh_fun h) = (h a)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2294	proof (unfold fresh_fun_def, rule the_equality)
c35381811d5c Initial revision. berghofe parents: diff changeset	2295	show "\<forall>(a'::'x). a'\<sharp>h \<longrightarrow> h a' = h a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2296	proof (intro strip)
c35381811d5c Initial revision. berghofe parents: diff changeset	2297	fix a'::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2298	assume c: "a'\<sharp>h"
c35381811d5c Initial revision. berghofe parents: diff changeset	2299	from pt at f1 a have "\<exists>(fr::'a). \<forall>(a::'x). a\<sharp>h \<longrightarrow> (h a) = fr" by (rule freshness_lemma)
c35381811d5c Initial revision. berghofe parents: diff changeset	2300	with b c show "h a' = h a" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2301	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2302	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2303	fix fr::"'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2304	assume "\<forall>a. a\<sharp>h \<longrightarrow> h a = fr"
c35381811d5c Initial revision. berghofe parents: diff changeset	2305	with b show "fr = h a" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2306	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2307
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2308	lemma fresh_fun_equiv_ineq:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2309	fixes h :: "'y\<Rightarrow>'a"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2310	and pi:: "'x prm"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2311	assumes pta: "pt TYPE('a) TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2312	and ptb: "pt TYPE('y) TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2313	and ptb':"pt TYPE('a) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2314	and at: "at TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2315	and at': "at TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2316	and cpa: "cp TYPE('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2317	and cpb: "cp TYPE('y) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2318	and f1: "finite ((supp h)::'y set)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2319	and a1: "\<exists>(a::'y). (a\<sharp>h \<and> a\<sharp>(h a))"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2320	shows "pi\<bullet>(fresh_fun h) = fresh_fun(pi\<bullet>h)" (is "?LHS = ?RHS")
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2321	proof -
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2322	have ptd: "pt TYPE('y) TYPE('y)" by (simp add: at_pt_inst[OF at'])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2323	have ptc: "pt TYPE('y\<Rightarrow>'a) TYPE('x)" by (simp add: pt_fun_inst[OF ptb, OF pta, OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2324	have cpc: "cp TYPE('y\<Rightarrow>'a) TYPE ('x) TYPE ('y)" by (rule cp_fun_inst[OF cpb,OF cpa])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2325	have f2: "finite ((supp (pi\<bullet>h))::'y set)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2326	proof -
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2327	from f1 have "finite (pi\<bullet>((supp h)::'y set))"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2328	by (simp add: pt_set_finite_ineq[OF ptb, OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2329	thus ?thesis
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2330	by (simp add: pt_perm_supp_ineq[OF ptc, OF ptb, OF at, OF cpc])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2331	qed
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2332	from a1 obtain a' where c0: "a'\<sharp>h \<and> a'\<sharp>(h a')" by force
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2333	hence c1: "a'\<sharp>h" and c2: "a'\<sharp>(h a')" by simp_all
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2334	have c3: "(pi\<bullet>a')\<sharp>(pi\<bullet>h)" using c1
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2335	by (simp add: pt_fresh_bij_ineq[OF ptc, OF ptb, OF at, OF cpc])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2336	have c4: "(pi\<bullet>a')\<sharp>(pi\<bullet>h) (pi\<bullet>a')"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2337	proof -
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2338	from c2 have "(pi\<bullet>a')\<sharp>(pi\<bullet>(h a'))"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2339	by (simp add: pt_fresh_bij_ineq[OF pta, OF ptb, OF at,OF cpa])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2340	thus ?thesis by (simp add: pt_fun_app_eq[OF ptb, OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2341	qed
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2342	have a2: "\<exists>(a::'y). (a\<sharp>(pi\<bullet>h) \<and> a\<sharp>((pi\<bullet>h) a))" using c3 c4 by force
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2343	have d1: "?LHS = pi\<bullet>(h a')" using c1 a1 by (simp add: fresh_fun_app[OF ptb', OF at', OF f1])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2344	have d2: "?RHS = (pi\<bullet>h) (pi\<bullet>a')" using c3 a2
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2345	by (simp add: fresh_fun_app[OF ptb', OF at', OF f2])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2346	show ?thesis using d1 d2 by (simp add: pt_fun_app_eq[OF ptb, OF at])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2347	qed
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2348
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2349	lemma fresh_fun_equiv:
c35381811d5c Initial revision. berghofe parents: diff changeset	2350	fixes h :: "'x\<Rightarrow>'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2351	and pi:: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2352	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2353	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2354	and f1: "finite ((supp h)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2355	and a1: "\<exists>(a::'x). (a\<sharp>h \<and> a\<sharp>(h a))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2356	shows "pi\<bullet>(fresh_fun h) = fresh_fun(pi\<bullet>h)" (is "?LHS = ?RHS")
c35381811d5c Initial revision. berghofe parents: diff changeset	2357	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2358	have ptb: "pt TYPE('x) TYPE('x)" by (simp add: at_pt_inst[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2359	have ptc: "pt TYPE('x\<Rightarrow>'a) TYPE('x)" by (simp add: pt_fun_inst[OF ptb, OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2360	have f2: "finite ((supp (pi\<bullet>h))::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2361	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2362	from f1 have "finite (pi\<bullet>((supp h)::'x set))" by (simp add: pt_set_finite_ineq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2363	thus ?thesis by (simp add: pt_perm_supp[OF ptc, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2364	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2365	from a1 obtain a' where c0: "a'\<sharp>h \<and> a'\<sharp>(h a')" by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2366	hence c1: "a'\<sharp>h" and c2: "a'\<sharp>(h a')" by simp_all
c35381811d5c Initial revision. berghofe parents: diff changeset	2367	have c3: "(pi\<bullet>a')\<sharp>(pi\<bullet>h)" using c1 by (simp add: pt_fresh_bij[OF ptc, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2368	have c4: "(pi\<bullet>a')\<sharp>(pi\<bullet>h) (pi\<bullet>a')"
c35381811d5c Initial revision. berghofe parents: diff changeset	2369	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2370	from c2 have "(pi\<bullet>a')\<sharp>(pi\<bullet>(h a'))" by (simp add: pt_fresh_bij[OF pta, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2371	thus ?thesis by (simp add: pt_fun_app_eq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2372	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2373	have a2: "\<exists>(a::'x). (a\<sharp>(pi\<bullet>h) \<and> a\<sharp>((pi\<bullet>h) a))" using c3 c4 by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2374	have d1: "?LHS = pi\<bullet>(h a')" using c1 a1 by (simp add: fresh_fun_app[OF pta, OF at, OF f1])
c35381811d5c Initial revision. berghofe parents: diff changeset	2375	have d2: "?RHS = (pi\<bullet>h) (pi\<bullet>a')" using c3 a2 by (simp add: fresh_fun_app[OF pta, OF at, OF f2])
c35381811d5c Initial revision. berghofe parents: diff changeset	2376	show ?thesis using d1 d2 by (simp add: pt_fun_app_eq[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2377	qed
19216 a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2378
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2379	lemma fresh_fun_supports:
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2380	fixes h :: "'x\<Rightarrow>'a"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2381	assumes pt: "pt TYPE('a) TYPE('x)"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2382	and at: "at TYPE('x)"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2383	and f1: "finite ((supp h)::'x set)"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2384	and a: "\<exists>(a::'x). (a\<sharp>h \<and> a\<sharp>(h a))"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2385	shows "((supp h)::'x set) supports (fresh_fun h)"
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2386	apply(simp add: "op supports_def" fresh_def[symmetric])
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2387	apply(auto)
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2388	apply(simp add: fresh_fun_equiv[OF pt, OF at, OF f1, OF a])
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2389	apply(simp add: pt_fresh_fresh[OF pt_fun_inst[OF at_pt_inst[OF at], OF pt], OF at, OF at])
a45baf1ac094 tuned some of the proofs about fresh_fun urbanc parents: 19164 diff changeset	2390	done
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2391
c35381811d5c Initial revision. berghofe parents: diff changeset	2392	section {* Abstraction function *}
c35381811d5c Initial revision. berghofe parents: diff changeset	2393	(==============================)
c35381811d5c Initial revision. berghofe parents: diff changeset	2394
c35381811d5c Initial revision. berghofe parents: diff changeset	2395	lemma pt_abs_fun_inst:
c35381811d5c Initial revision. berghofe parents: diff changeset	2396	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2397	and at: "at TYPE('x)"
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	2398	shows "pt TYPE('x\<Rightarrow>('a noption)) TYPE('x)"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2399	by (rule pt_fun_inst[OF at_pt_inst[OF at],OF pt_noption_inst[OF pt],OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2400
c35381811d5c Initial revision. berghofe parents: diff changeset	2401	constdefs
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	2402	abs_fun :: "'x\<Rightarrow>'a\<Rightarrow>('x\<Rightarrow>('a noption))" ("[_]._" [100,100] 100)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2403	"[a].x \<equiv> (\<lambda>b. (if b=a then nSome(x) else (if b\<sharp>x then nSome([(a,b)]\<bullet>x) else nNone)))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2404
18745 060400dc077c a fixme comments about abs_fun_if, which should be called perm_if urbanc parents: 18703 diff changeset	2405	(* FIXME: should be called perm_if and placed close to the definition of permutations on bools *)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2406	lemma abs_fun_if:
c35381811d5c Initial revision. berghofe parents: diff changeset	2407	fixes pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2408	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2409	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2410	and c :: "bool"
c35381811d5c Initial revision. berghofe parents: diff changeset	2411	shows "pi\<bullet>(if c then x else y) = (if c then (pi\<bullet>x) else (pi\<bullet>y))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2412	by force
c35381811d5c Initial revision. berghofe parents: diff changeset	2413
c35381811d5c Initial revision. berghofe parents: diff changeset	2414	lemma abs_fun_pi_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	2415	fixes a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2416	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2417	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2418	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2419	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2420	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2421	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2422	shows "pi\<bullet>([a].x) = [(pi\<bullet>a)].(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2423	apply(simp add: abs_fun_def perm_fun_def abs_fun_if)
c35381811d5c Initial revision. berghofe parents: diff changeset	2424	apply(simp only: expand_fun_eq)
c35381811d5c Initial revision. berghofe parents: diff changeset	2425	apply(rule allI)
c35381811d5c Initial revision. berghofe parents: diff changeset	2426	apply(subgoal_tac "(((rev pi)\<bullet>(xa::'y)) = (a::'y)) = (xa = pi\<bullet>a)")(A)
c35381811d5c Initial revision. berghofe parents: diff changeset	2427	apply(subgoal_tac "(((rev pi)\<bullet>xa)\<sharp>x) = (xa\<sharp>(pi\<bullet>x))")(B)
c35381811d5c Initial revision. berghofe parents: diff changeset	2428	apply(subgoal_tac "pi\<bullet>([(a,(rev pi)\<bullet>xa)]\<bullet>x) = [(pi\<bullet>a,xa)]\<bullet>(pi\<bullet>x)")(C)
c35381811d5c Initial revision. berghofe parents: diff changeset	2429	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	2430	(C)
c35381811d5c Initial revision. berghofe parents: diff changeset	2431	apply(simp add: cp1[OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	2432	apply(simp add: pt_pi_rev[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2433	(B)
c35381811d5c Initial revision. berghofe parents: diff changeset	2434	apply(simp add: pt_fresh_left_ineq[OF pta, OF ptb, OF at, OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	2435	(A)
c35381811d5c Initial revision. berghofe parents: diff changeset	2436	apply(rule iffI)
c35381811d5c Initial revision. berghofe parents: diff changeset	2437	apply(rule pt_bij2[OF ptb, OF at, THEN sym])
c35381811d5c Initial revision. berghofe parents: diff changeset	2438	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	2439	apply(rule pt_bij2[OF ptb, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2440	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	2441	done
c35381811d5c Initial revision. berghofe parents: diff changeset	2442
c35381811d5c Initial revision. berghofe parents: diff changeset	2443	lemma abs_fun_pi:
c35381811d5c Initial revision. berghofe parents: diff changeset	2444	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2445	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2446	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2447	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2448	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2449	shows "pi\<bullet>([a].x) = [(pi\<bullet>a)].(pi\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2450	apply(rule abs_fun_pi_ineq)
c35381811d5c Initial revision. berghofe parents: diff changeset	2451	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	2452	apply(rule at_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	2453	apply(rule at)+
c35381811d5c Initial revision. berghofe parents: diff changeset	2454	apply(rule cp_pt_inst)
c35381811d5c Initial revision. berghofe parents: diff changeset	2455	apply(rule pt)
c35381811d5c Initial revision. berghofe parents: diff changeset	2456	apply(rule at)
c35381811d5c Initial revision. berghofe parents: diff changeset	2457	done
c35381811d5c Initial revision. berghofe parents: diff changeset	2458
c35381811d5c Initial revision. berghofe parents: diff changeset	2459	lemma abs_fun_eq1:
c35381811d5c Initial revision. berghofe parents: diff changeset	2460	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2461	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2462	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2463	shows "([a].x = [a].y) = (x = y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2464	apply(auto simp add: abs_fun_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	2465	apply(auto simp add: expand_fun_eq)
c35381811d5c Initial revision. berghofe parents: diff changeset	2466	apply(drule_tac x="a" in spec)
c35381811d5c Initial revision. berghofe parents: diff changeset	2467	apply(simp)
c35381811d5c Initial revision. berghofe parents: diff changeset	2468	done
c35381811d5c Initial revision. berghofe parents: diff changeset	2469
c35381811d5c Initial revision. berghofe parents: diff changeset	2470	lemma abs_fun_eq2:
c35381811d5c Initial revision. berghofe parents: diff changeset	2471	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2472	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2473	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2474	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2475	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2476	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2477	and a1: "a\<noteq>b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2478	and a2: "[a].x = [b].y"
18268 734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2479	shows "x=[(a,b)]\<bullet>y \<and> a\<sharp>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2480	proof -
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2481	from a2 have "\<forall>c::'x. ([a].x) c = ([b].y) c" by (force simp add: expand_fun_eq)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2482	hence "([a].x) a = ([b].y) a" by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2483	hence a3: "nSome(x) = ([b].y) a" by (simp add: abs_fun_def)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2484	show "x=[(a,b)]\<bullet>y \<and> a\<sharp>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2485	proof (cases "a\<sharp>y")
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2486	assume a4: "a\<sharp>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2487	hence "x=[(b,a)]\<bullet>y" using a3 a1 by (simp add: abs_fun_def)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2488	moreover
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2489	have "[(a,b)]\<bullet>y = [(b,a)]\<bullet>y" by (rule pt3[OF pt], rule at_ds5[OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2490	ultimately show ?thesis using a4 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2491	next
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2492	assume "\<not>a\<sharp>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2493	hence "nSome(x) = nNone" using a1 a3 by (simp add: abs_fun_def)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2494	hence False by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2495	thus ?thesis by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2496	qed
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2497	qed
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2498
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2499	lemma abs_fun_eq3:
c35381811d5c Initial revision. berghofe parents: diff changeset	2500	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2501	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2502	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2503	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2504	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2505	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2506	and a1: "a\<noteq>b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2507	and a2: "x=[(a,b)]\<bullet>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2508	and a3: "a\<sharp>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2509	shows "[a].x =[b].y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2510	proof -
18268 734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2511	show ?thesis
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2512	proof (simp only: abs_fun_def expand_fun_eq, intro strip)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2513	fix c::"'x"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2514	let ?LHS = "if c=a then nSome(x) else if c\<sharp>x then nSome([(a,c)]\<bullet>x) else nNone"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2515	and ?RHS = "if c=b then nSome(y) else if c\<sharp>y then nSome([(b,c)]\<bullet>y) else nNone"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2516	show "?LHS=?RHS"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2517	proof -
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2518	have "(c=a) \<or> (c=b) \<or> (c\<noteq>a \<and> c\<noteq>b)" by blast
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2519	moreover --"case c=a"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2520	{ have "nSome(x) = nSome([(a,b)]\<bullet>y)" using a2 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2521	also have "\<dots> = nSome([(b,a)]\<bullet>y)" by (simp, rule pt3[OF pt], rule at_ds5[OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2522	finally have "nSome(x) = nSome([(b,a)]\<bullet>y)" by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2523	moreover
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2524	assume "c=a"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2525	ultimately have "?LHS=?RHS" using a1 a3 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2526	}
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2527	moreover -- "case c=b"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2528	{ have a4: "y=[(a,b)]\<bullet>x" using a2 by (simp only: pt_swap_bij[OF pt, OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2529	hence "a\<sharp>([(a,b)]\<bullet>x)" using a3 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2530	hence "b\<sharp>x" by (simp add: at_calc[OF at] pt_fresh_left[OF pt, OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2531	moreover
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2532	assume "c=b"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2533	ultimately have "?LHS=?RHS" using a1 a4 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2534	}
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2535	moreover -- "case c\<noteq>a \<and> c\<noteq>b"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2536	{ assume a5: "c\<noteq>a \<and> c\<noteq>b"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2537	moreover
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2538	have "c\<sharp>x = c\<sharp>y" using a2 a5 by (force simp add: at_calc[OF at] pt_fresh_left[OF pt, OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2539	moreover
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2540	have "c\<sharp>y \<longrightarrow> [(a,c)]\<bullet>x = [(b,c)]\<bullet>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2541	proof (intro strip)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2542	assume a6: "c\<sharp>y"
18295 dd50de393330 changed \<sim> of permutation equality to \<triangleq> urbanc parents: 18294 diff changeset	2543	have "[(a,c),(b,c),(a,c)] \<triangleq> [(a,b)]" using a1 a5 by (force intro: at_ds3[OF at])
18268 734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2544	hence "[(a,c)]\<bullet>([(b,c)]\<bullet>([(a,c)]\<bullet>y)) = [(a,b)]\<bullet>y"
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2545	by (simp add: pt2[OF pt, symmetric] pt3[OF pt])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2546	hence "[(a,c)]\<bullet>([(b,c)]\<bullet>y) = [(a,b)]\<bullet>y" using a3 a6
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2547	by (simp add: pt_fresh_fresh[OF pt, OF at])
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2548	hence "[(a,c)]\<bullet>([(b,c)]\<bullet>y) = x" using a2 by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2549	hence "[(b,c)]\<bullet>y = [(a,c)]\<bullet>x" by (drule_tac pt_bij1[OF pt, OF at], simp)
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2550	thus "[(a,c)]\<bullet>x = [(b,c)]\<bullet>y" by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2551	qed
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2552	ultimately have "?LHS=?RHS" by simp
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2553	}
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2554	ultimately show "?LHS = ?RHS" by blast
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2555	qed
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2556	qed
18268 734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2557	qed
734f23ad5d8f ISAR-fied two proofs about equality for abstraction functions. urbanc parents: 18264 diff changeset	2558
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2559	lemma abs_fun_eq:
c35381811d5c Initial revision. berghofe parents: diff changeset	2560	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2561	and y :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2562	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2563	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2564	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2565	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2566	shows "([a].x = [b].y) = ((a=b \<and> x=y)\<or>(a\<noteq>b \<and> x=[(a,b)]\<bullet>y \<and> a\<sharp>y))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2567	proof (rule iffI)
c35381811d5c Initial revision. berghofe parents: diff changeset	2568	assume b: "[a].x = [b].y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2569	show "(a=b \<and> x=y)\<or>(a\<noteq>b \<and> x=[(a,b)]\<bullet>y \<and> a\<sharp>y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2570	proof (cases "a=b")
c35381811d5c Initial revision. berghofe parents: diff changeset	2571	case True with b show ?thesis by (simp add: abs_fun_eq1)
c35381811d5c Initial revision. berghofe parents: diff changeset	2572	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2573	case False with b show ?thesis by (simp add: abs_fun_eq2[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2574	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2575	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2576	assume "(a=b \<and> x=y)\<or>(a\<noteq>b \<and> x=[(a,b)]\<bullet>y \<and> a\<sharp>y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2577	thus "[a].x = [b].y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2578	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	2579	assume "a=b \<and> x=y" thus ?thesis by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2580	next
c35381811d5c Initial revision. berghofe parents: diff changeset	2581	assume "a\<noteq>b \<and> x=[(a,b)]\<bullet>y \<and> a\<sharp>y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2582	thus ?thesis by (simp add: abs_fun_eq3[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2583	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2584	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2585
19562 e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2586	lemma abs_fun_eq':
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2587	fixes x :: "'a"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2588	and y :: "'a"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2589	and c :: "'x"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2590	and a :: "'x"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2591	and b :: "'x"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2592	assumes pt: "pt TYPE('a) TYPE('x)"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2593	and at: "at TYPE('x)"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2594	and fr: "c\<noteq>a" "c\<noteq>b" "c\<sharp>x" "c\<sharp>y"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2595	shows "([a].x = [b].y) = ([(a,c)]\<bullet>x = [(b,c)]\<bullet>y)"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2596	proof (rule iffI)
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2597	assume eq0: "[a].x = [b].y"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2598	show "[(a,c)]\<bullet>x = [(b,c)]\<bullet>y"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2599	proof (cases "a=b")
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2600	case True then show ?thesis using eq0 by (simp add: pt_bij[OF pt, OF at] abs_fun_eq[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2601	next
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2602	case False
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2603	have ineq: "a\<noteq>b" by fact
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2604	with eq0 have eq: "x=[(a,b)]\<bullet>y" and fr': "a\<sharp>y" by (simp_all add: abs_fun_eq[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2605	from eq have "[(a,c)]\<bullet>x = [(a,c)]\<bullet>[(a,b)]\<bullet>y" by (simp add: pt_bij[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2606	also have "\<dots> = ([(a,c)]\<bullet>[(a,b)])\<bullet>([(a,c)]\<bullet>y)" by (rule pt_perm_compose[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2607	also have "\<dots> = [(c,b)]\<bullet>y" using ineq fr fr'
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2608	by (simp add: pt_fresh_fresh[OF pt, OF at] at_calc[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2609	also have "\<dots> = [(b,c)]\<bullet>y" by (rule pt3[OF pt], rule at_ds5[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2610	finally show ?thesis by simp
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2611	qed
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2612	next
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2613	assume eq: "[(a,c)]\<bullet>x = [(b,c)]\<bullet>y"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2614	thus "[a].x = [b].y"
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2615	proof (cases "a=b")
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2616	case True then show ?thesis using eq by (simp add: pt_bij[OF pt, OF at] abs_fun_eq[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2617	next
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2618	case False
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2619	have ineq: "a\<noteq>b" by fact
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2620	from fr have "([(a,c)]\<bullet>c)\<sharp>([(a,c)]\<bullet>x)" by (simp add: pt_fresh_bij[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2621	hence "a\<sharp>([(b,c)]\<bullet>y)" using eq fr by (simp add: at_calc[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2622	hence fr0: "a\<sharp>y" using ineq fr by (simp add: pt_fresh_left[OF pt, OF at] at_calc[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2623	from eq have "x = (rev [(a,c)])\<bullet>([(b,c)]\<bullet>y)" by (rule pt_bij1[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2624	also have "\<dots> = [(a,c)]\<bullet>([(b,c)]\<bullet>y)" by simp
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2625	also have "\<dots> = ([(a,c)]\<bullet>[(b,c)])\<bullet>([(a,c)]\<bullet>y)" by (rule pt_perm_compose[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2626	also have "\<dots> = [(b,a)]\<bullet>y" using ineq fr fr0
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2627	by (simp add: pt_fresh_fresh[OF pt, OF at] at_calc[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2628	also have "\<dots> = [(a,b)]\<bullet>y" by (rule pt3[OF pt], rule at_ds5[OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2629	finally show ?thesis using ineq fr0 by (simp add: abs_fun_eq[OF pt, OF at])
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2630	qed
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2631	qed
e56b3c967ae8 added the lemma abs_fun_eq' to the nominal theory, urbanc parents: 19494 diff changeset	2632
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2633	lemma abs_fun_supp_approx:
c35381811d5c Initial revision. berghofe parents: diff changeset	2634	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2635	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2636	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2637	and at: "at TYPE('x)"
18048 7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2638	shows "((supp ([a].x))::'x set) \<subseteq> (supp (x,a))"
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2639	proof
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2640	fix c
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2641	assume "c\<in>((supp ([a].x))::'x set)"
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2642	hence "infinite {b. [(c,b)]\<bullet>([a].x) \<noteq> [a].x}" by (simp add: supp_def)
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2643	hence "infinite {b. [([(c,b)]\<bullet>a)].([(c,b)]\<bullet>x) \<noteq> [a].x}" by (simp add: abs_fun_pi[OF pt, OF at])
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2644	moreover
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2645	have "{b. [([(c,b)]\<bullet>a)].([(c,b)]\<bullet>x) \<noteq> [a].x} \<subseteq> {b. ([(c,b)]\<bullet>x,[(c,b)]\<bullet>a) \<noteq> (x, a)}" by force
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2646	ultimately have "infinite {b. ([(c,b)]\<bullet>x,[(c,b)]\<bullet>a) \<noteq> (x, a)}" by (simp add: infinite_super)
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2647	thus "c\<in>(supp (x,a))" by (simp add: supp_def)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2648	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2649
c35381811d5c Initial revision. berghofe parents: diff changeset	2650	lemma abs_fun_finite_supp:
c35381811d5c Initial revision. berghofe parents: diff changeset	2651	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2652	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2653	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2654	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2655	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2656	shows "finite ((supp ([a].x))::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2657	proof -
18048 7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2658	from f have "finite ((supp (x,a))::'x set)" by (simp add: supp_prod at_supp[OF at])
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2659	moreover
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2660	have "((supp ([a].x))::'x set) \<subseteq> (supp (x,a))" by (rule abs_fun_supp_approx[OF pt, OF at])
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2661	ultimately show ?thesis by (simp add: finite_subset)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2662	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2663
c35381811d5c Initial revision. berghofe parents: diff changeset	2664	lemma fresh_abs_funI1:
c35381811d5c Initial revision. berghofe parents: diff changeset	2665	fixes x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2666	and a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2667	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2668	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2669	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2670	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2671	and a1: "b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2672	and a2: "a\<noteq>b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2673	shows "b\<sharp>([a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2674	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2675	have "\<exists>c::'x. c\<sharp>(b,a,x,[a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2676	proof (rule at_exists_fresh[OF at], auto simp add: supp_prod at_supp[OF at] f)
c35381811d5c Initial revision. berghofe parents: diff changeset	2677	show "finite ((supp ([a].x))::'x set)" using f
c35381811d5c Initial revision. berghofe parents: diff changeset	2678	by (simp add: abs_fun_finite_supp[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2679	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2680	then obtain c where fr1: "c\<noteq>b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2681	and fr2: "c\<noteq>a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2682	and fr3: "c\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2683	and fr4: "c\<sharp>([a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2684	by (force simp add: fresh_prod at_fresh[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2685	have e: "[(c,b)]\<bullet>([a].x) = [a].([(c,b)]\<bullet>x)" using a2 fr1 fr2
c35381811d5c Initial revision. berghofe parents: diff changeset	2686	by (force simp add: abs_fun_pi[OF pt, OF at] at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2687	from fr4 have "([(c,b)]\<bullet>c)\<sharp> ([(c,b)]\<bullet>([a].x))"
c35381811d5c Initial revision. berghofe parents: diff changeset	2688	by (simp add: pt_fresh_bij[OF pt_abs_fun_inst[OF pt, OF at], OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2689	hence "b\<sharp>([a].([(c,b)]\<bullet>x))" using fr1 fr2 e
c35381811d5c Initial revision. berghofe parents: diff changeset	2690	by (simp add: at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2691	thus ?thesis using a1 fr3
c35381811d5c Initial revision. berghofe parents: diff changeset	2692	by (simp add: pt_fresh_fresh[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2693	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2694
c35381811d5c Initial revision. berghofe parents: diff changeset	2695	lemma fresh_abs_funE:
c35381811d5c Initial revision. berghofe parents: diff changeset	2696	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2697	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2698	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2699	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2700	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2701	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2702	and a1: "b\<sharp>([a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2703	and a2: "b\<noteq>a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2704	shows "b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2705	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2706	have "\<exists>c::'x. c\<sharp>(b,a,x,[a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2707	proof (rule at_exists_fresh[OF at], auto simp add: supp_prod at_supp[OF at] f)
c35381811d5c Initial revision. berghofe parents: diff changeset	2708	show "finite ((supp ([a].x))::'x set)" using f
c35381811d5c Initial revision. berghofe parents: diff changeset	2709	by (simp add: abs_fun_finite_supp[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2710	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2711	then obtain c where fr1: "b\<noteq>c"
c35381811d5c Initial revision. berghofe parents: diff changeset	2712	and fr2: "c\<noteq>a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2713	and fr3: "c\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2714	and fr4: "c\<sharp>([a].x)" by (force simp add: fresh_prod at_fresh[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2715	have "[a].x = [(b,c)]\<bullet>([a].x)" using a1 fr4
c35381811d5c Initial revision. berghofe parents: diff changeset	2716	by (simp add: pt_fresh_fresh[OF pt_abs_fun_inst[OF pt, OF at], OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2717	hence "[a].x = [a].([(b,c)]\<bullet>x)" using fr2 a2
c35381811d5c Initial revision. berghofe parents: diff changeset	2718	by (force simp add: abs_fun_pi[OF pt, OF at] at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2719	hence b: "([(b,c)]\<bullet>x) = x" by (simp add: abs_fun_eq1)
c35381811d5c Initial revision. berghofe parents: diff changeset	2720	from fr3 have "([(b,c)]\<bullet>c)\<sharp>([(b,c)]\<bullet>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2721	by (simp add: pt_fresh_bij[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2722	thus ?thesis using b fr1 by (simp add: at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2723	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2724
c35381811d5c Initial revision. berghofe parents: diff changeset	2725	lemma fresh_abs_funI2:
c35381811d5c Initial revision. berghofe parents: diff changeset	2726	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2727	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2728	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2729	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2730	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2731	shows "a\<sharp>([a].x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2732	proof -
c35381811d5c Initial revision. berghofe parents: diff changeset	2733	have "\<exists>c::'x. c\<sharp>(a,x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2734	by (rule at_exists_fresh[OF at], auto simp add: supp_prod at_supp[OF at] f)
c35381811d5c Initial revision. berghofe parents: diff changeset	2735	then obtain c where fr1: "a\<noteq>c" and fr1_sym: "c\<noteq>a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2736	and fr2: "c\<sharp>x" by (force simp add: fresh_prod at_fresh[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2737	have "c\<sharp>([a].x)" using f fr1 fr2 by (simp add: fresh_abs_funI1[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2738	hence "([(c,a)]\<bullet>c)\<sharp>([(c,a)]\<bullet>([a].x))" using fr1
c35381811d5c Initial revision. berghofe parents: diff changeset	2739	by (simp only: pt_fresh_bij[OF pt_abs_fun_inst[OF pt, OF at], OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2740	hence a: "a\<sharp>([c].([(c,a)]\<bullet>x))" using fr1_sym
c35381811d5c Initial revision. berghofe parents: diff changeset	2741	by (simp add: abs_fun_pi[OF pt, OF at] at_calc[OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2742	have "[c].([(c,a)]\<bullet>x) = ([a].x)" using fr1_sym fr2
c35381811d5c Initial revision. berghofe parents: diff changeset	2743	by (simp add: abs_fun_eq[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2744	thus ?thesis using a by simp
c35381811d5c Initial revision. berghofe parents: diff changeset	2745	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2746
c35381811d5c Initial revision. berghofe parents: diff changeset	2747	lemma fresh_abs_fun_iff:
c35381811d5c Initial revision. berghofe parents: diff changeset	2748	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2749	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2750	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2751	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2752	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2753	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2754	shows "(b\<sharp>([a].x)) = (b=a \<or> b\<sharp>x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2755	by (auto dest: fresh_abs_funE[OF pt, OF at,OF f]
c35381811d5c Initial revision. berghofe parents: diff changeset	2756	intro: fresh_abs_funI1[OF pt, OF at,OF f]
c35381811d5c Initial revision. berghofe parents: diff changeset	2757	fresh_abs_funI2[OF pt, OF at,OF f])
c35381811d5c Initial revision. berghofe parents: diff changeset	2758
c35381811d5c Initial revision. berghofe parents: diff changeset	2759	lemma abs_fun_supp:
c35381811d5c Initial revision. berghofe parents: diff changeset	2760	fixes a :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2761	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2762	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2763	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2764	and f: "finite ((supp x)::'x set)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2765	shows "supp ([a].x) = (supp x)-{a}"
c35381811d5c Initial revision. berghofe parents: diff changeset	2766	by (force simp add: supp_fresh_iff fresh_abs_fun_iff[OF pt, OF at, OF f])
c35381811d5c Initial revision. berghofe parents: diff changeset	2767
18048 7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2768	(* maybe needs to be better stated as supp intersection supp *)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2769	lemma abs_fun_supp_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	2770	fixes a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2771	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2772	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2773	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2774	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2775	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2776	and dj: "disjoint TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2777	shows "((supp ([a].x))::'x set) = (supp x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2778	apply(auto simp add: supp_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	2779	apply(auto simp add: abs_fun_pi_ineq[OF pta, OF ptb, OF at, OF cp])
c35381811d5c Initial revision. berghofe parents: diff changeset	2780	apply(auto simp add: dj_perm_forget[OF dj])
c35381811d5c Initial revision. berghofe parents: diff changeset	2781	apply(auto simp add: abs_fun_eq1)
c35381811d5c Initial revision. berghofe parents: diff changeset	2782	done
c35381811d5c Initial revision. berghofe parents: diff changeset	2783
c35381811d5c Initial revision. berghofe parents: diff changeset	2784	lemma fresh_abs_fun_iff_ineq:
c35381811d5c Initial revision. berghofe parents: diff changeset	2785	fixes a :: "'y"
c35381811d5c Initial revision. berghofe parents: diff changeset	2786	and b :: "'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2787	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2788	assumes pta: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2789	and ptb: "pt TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2790	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2791	and cp: "cp TYPE('a) TYPE('x) TYPE('y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2792	and dj: "disjoint TYPE('y) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2793	shows "b\<sharp>([a].x) = b\<sharp>x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2794	by (simp add: fresh_def abs_fun_supp_ineq[OF pta, OF ptb, OF at, OF cp, OF dj])
c35381811d5c Initial revision. berghofe parents: diff changeset	2795
18048 7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2796	section {* abstraction type for the parsing in nominal datatype *}
7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2797	(==============================================================)
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2798	consts
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	2799	"ABS_set" :: "('x\<Rightarrow>('a noption)) set"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2800	inductive ABS_set
c35381811d5c Initial revision. berghofe parents: diff changeset	2801	intros
c35381811d5c Initial revision. berghofe parents: diff changeset	2802	ABS_in: "(abs_fun a x)\<in>ABS_set"
c35381811d5c Initial revision. berghofe parents: diff changeset	2803
18579 002d371401f5 changed the name of the type "nOption" to "noption". urbanc parents: 18578 diff changeset	2804	typedef (ABS) ('x,'a) ABS = "ABS_set::('x\<Rightarrow>('a noption)) set"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2805	proof
c35381811d5c Initial revision. berghofe parents: diff changeset	2806	fix x::"'a" and a::"'x"
c35381811d5c Initial revision. berghofe parents: diff changeset	2807	show "(abs_fun a x)\<in> ABS_set" by (rule ABS_in)
c35381811d5c Initial revision. berghofe parents: diff changeset	2808	qed
c35381811d5c Initial revision. berghofe parents: diff changeset	2809
c35381811d5c Initial revision. berghofe parents: diff changeset	2810	syntax ABS :: "type \<Rightarrow> type \<Rightarrow> type" ("\<guillemotleft>_\<guillemotright>_" [1000,1000] 1000)
c35381811d5c Initial revision. berghofe parents: diff changeset	2811
c35381811d5c Initial revision. berghofe parents: diff changeset	2812
18048 7003308ff73a tuned my last commit urbanc parents: 18047 diff changeset	2813	section {* lemmas for deciding permutation equations *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2814	(===================================================)
c35381811d5c Initial revision. berghofe parents: diff changeset	2815
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2816	lemma perm_aux_fold:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2817	shows "perm_aux pi x = pi\<bullet>x" by (simp only: perm_aux_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2818
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2819	lemma pt_perm_compose_aux:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2820	fixes pi1 :: "'x prm"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2821	and pi2 :: "'x prm"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2822	and x :: "'a"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2823	assumes pt: "pt TYPE('a) TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2824	and at: "at TYPE('x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2825	shows "pi2\<bullet>(pi1\<bullet>x) = perm_aux (pi2\<bullet>pi1) (pi2\<bullet>x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2826	proof -
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2827	have "(pi2@pi1) \<triangleq> ((pi2\<bullet>pi1)@pi2)" by (rule at_ds8)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2828	hence "(pi2@pi1)\<bullet>x = ((pi2\<bullet>pi1)@pi2)\<bullet>x" by (rule pt3[OF pt])
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2829	thus ?thesis by (simp add: pt2[OF pt] perm_aux_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2830	qed
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2831
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2832	lemma cp1_aux:
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2833	fixes pi1::"'x prm"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2834	and pi2::"'y prm"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2835	and x ::"'a"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2836	assumes cp: "cp TYPE ('a) TYPE('x) TYPE('y)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2837	shows "pi1\<bullet>(pi2\<bullet>x) = perm_aux (pi1\<bullet>pi2) (pi1\<bullet>x)"
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2838	using cp by (simp add: cp_def perm_aux_def)
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2839
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2840	lemma perm_eq_app:
c35381811d5c Initial revision. berghofe parents: diff changeset	2841	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2842	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2843	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2844	assumes pt: "pt TYPE('a) TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2845	and at: "at TYPE('x)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2846	shows "(pi\<bullet>(f x)=y) = ((pi\<bullet>f)(pi\<bullet>x)=y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2847	by (simp add: pt_fun_app_eq[OF pt, OF at])
c35381811d5c Initial revision. berghofe parents: diff changeset	2848
c35381811d5c Initial revision. berghofe parents: diff changeset	2849	lemma perm_eq_lam:
c35381811d5c Initial revision. berghofe parents: diff changeset	2850	fixes f :: "'a\<Rightarrow>'b"
c35381811d5c Initial revision. berghofe parents: diff changeset	2851	and x :: "'a"
c35381811d5c Initial revision. berghofe parents: diff changeset	2852	and pi :: "'x prm"
c35381811d5c Initial revision. berghofe parents: diff changeset	2853	shows "((pi\<bullet>(\<lambda>x. f x))=y) = ((\<lambda>x. (pi\<bullet>(f ((rev pi)\<bullet>x))))=y)"
c35381811d5c Initial revision. berghofe parents: diff changeset	2854	by (simp add: perm_fun_def)
c35381811d5c Initial revision. berghofe parents: diff changeset	2855
19132 ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2856	section {* test *}
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2857	lemma at_prm_eq_compose:
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2858	fixes pi1 :: "'x prm"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2859	and pi2 :: "'x prm"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2860	and pi3 :: "'x prm"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2861	assumes at: "at TYPE('x)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2862	and a: "pi1 \<triangleq> pi2"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2863	shows "(pi3\<bullet>pi1) \<triangleq> (pi3\<bullet>pi2)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2864	proof -
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2865	have pt: "pt TYPE('x) TYPE('x)" by (rule at_pt_inst[OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2866	have pt_prm: "pt TYPE('x prm) TYPE('x)"
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2867	by (rule pt_list_inst[OF pt_prod_inst[OF pt, OF pt]])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2868	from a show ?thesis
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2869	apply -
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2870	apply(auto simp add: prm_eq_def)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2871	apply(rule_tac pi="rev pi3" in pt_bij4[OF pt, OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2872	apply(rule trans)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2873	apply(rule pt_perm_compose[OF pt, OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2874	apply(simp add: pt_rev_pi[OF pt_prm, OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2875	apply(rule sym)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2876	apply(rule trans)
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2877	apply(rule pt_perm_compose[OF pt, OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2878	apply(simp add: pt_rev_pi[OF pt_prm, OF at])
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2879	done
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2880	qed
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2881
ff41946e5092 added lemmas urbanc parents: 19107 diff changeset	2882
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2883	(***************************************)
c35381811d5c Initial revision. berghofe parents: diff changeset	2884	(* setup for the individial atom-kinds *)
18047 3d643b13eb65 simplified the abs_supp_approx proof and tuned some comments in urbanc parents: 18012 diff changeset	2885	(* and nominal datatypes *)
18068 e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	2886	use "nominal_atoms.ML"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2887	use "nominal_package.ML"
18068 e8c3d371594e Moved atom stuff to new file nominal_atoms.ML berghofe parents: 18053 diff changeset	2888	setup "NominalAtoms.setup"
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2889
18047 3d643b13eb65 simplified the abs_supp_approx proof and tuned some comments in urbanc parents: 18012 diff changeset	2890	(*****************************************)
3d643b13eb65 simplified the abs_supp_approx proof and tuned some comments in urbanc parents: 18012 diff changeset	2891	(* setup for induction principles method *)
18294 bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	2892
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2893	use "nominal_induct.ML";
c35381811d5c Initial revision. berghofe parents: diff changeset	2894	method_setup nominal_induct =
18294 bbfd64cc91ab fresh_unit_elim and fresh_prod_elim -- for nominal_induct; wenzelm parents: 18268 diff changeset	2895	{* NominalInduct.nominal_induct_method *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2896	{* nominal induction *}
c35381811d5c Initial revision. berghofe parents: diff changeset	2897
c35381811d5c Initial revision. berghofe parents: diff changeset	2898	(*******************************)
c35381811d5c Initial revision. berghofe parents: diff changeset	2899	(* permutation equality tactic *)
c35381811d5c Initial revision. berghofe parents: diff changeset	2900	use "nominal_permeq.ML";
18012 23e6cfda8c4b Added (optional) arguments to the tactics urbanc parents: 17871 diff changeset	2901
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2902	method_setup perm_simp =
c35381811d5c Initial revision. berghofe parents: diff changeset	2903	{* perm_eq_meth *}
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2904	{* simp rules and simprocs for analysing permutations *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2905
c35381811d5c Initial revision. berghofe parents: diff changeset	2906	method_setup perm_simp_debug =
c35381811d5c Initial revision. berghofe parents: diff changeset	2907	{* perm_eq_meth_debug *}
19477 a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2908	{* simp rules and simprocs for analysing permutations including debuging facilities *}
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2909
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2910	method_setup perm_full_simp =
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2911	{* perm_full_eq_meth *}
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2912	{* tactic for deciding equalities involving permutations *}
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2913
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2914	method_setup perm_full_simp_debug =
a95176d0f0dd isar-keywords.el urbanc parents: 19329 diff changeset	2915	{* perm_full_eq_meth_debug *}
18047 3d643b13eb65 simplified the abs_supp_approx proof and tuned some comments in urbanc parents: 18012 diff changeset	2916	{* tactic for deciding equalities involving permutations including debuging facilities *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2917
c35381811d5c Initial revision. berghofe parents: diff changeset	2918	method_setup supports_simp =
c35381811d5c Initial revision. berghofe parents: diff changeset	2919	{* supports_meth *}
18703 13e11abcfc96 fixed one proof that broke because of the changes urbanc parents: 18657 diff changeset	2920	{* tactic for deciding whether something supports something else *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2921
c35381811d5c Initial revision. berghofe parents: diff changeset	2922	method_setup supports_simp_debug =
c35381811d5c Initial revision. berghofe parents: diff changeset	2923	{* supports_meth_debug *}
18703 13e11abcfc96 fixed one proof that broke because of the changes urbanc parents: 18657 diff changeset	2924	{* tactic for deciding whether something supports something else including debuging facilities *}
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2925
19164 0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2926	method_setup finite_guess =
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2927	{* finite_gs_meth *}
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2928	{* tactic for deciding whether something has finite support *}
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2929
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2930	method_setup finite_guess_debug =
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2931	{* finite_gs_meth_debug *}
0eccb98b1fdb added initialisation-code for finite_guess urbanc parents: 19140 diff changeset	2932	{* tactic for deciding whether something has finite support including debuging facilities *}
19494 2e909d5309f4 Renamed "nominal" theory to "Nominal". berghofe parents: 19477 diff changeset	2933
19638 4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2934	(* FIXME: this code has not yet been checked in
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2935	method_setup fresh_guess =
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2936	{* fresh_gs_meth *}
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2937	{* tactic for deciding whether an atom is fresh for something*}
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2938
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2939	method_setup fresh_guess_debug =
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2940	{* fresh_gs_meth_debug *}
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2941	{* tactic for deciding whether an atom is fresh for something including debuging facilities *}
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2942	*)
4358b88a9d12 added the lemmas pt_fresh_aux and pt_fresh_aux_ineq urbanc parents: 19634 diff changeset	2943
17870 c35381811d5c Initial revision. berghofe parents: diff changeset	2944	end

author	urbanc
	Mon, 05 Jun 2006 18:38:41 +0200
changeset 19771	b4a0da62126e
parent 19751	3006498da5c5
child 19772	45897b49fdd2
permissions	-rw-r--r--