isabelle: src/HOLCF/Porder.ML@42cbf6256d60 (annotated)

2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	1	(* Title: HOLCF/Porder.thy
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	2	ID: $Id$
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	3	Author: Franz Regensburger
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	4	Copyright 1993 Technische Universitaet Muenchen
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	5
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	6	Lemmas for theory Porder.thy
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	7	*)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	8
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	9	open Porder;
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	10
625 119391dd1d59 New version nipkow parents: 442 diff changeset	11	(* ------------------------------------------------------------------------ *)
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	12	(* lubs are unique *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	13	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	14
4031 42cbf6256d60 fixed spaces in qed; wenzelm parents: 3842 diff changeset	15	qed_goalw "unique_lub" thy [is_lub, is_ub]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	16	"[\| S <<\| x ; S <<\| y \|] ==> x=y"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	17	( fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	18	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	19	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	20	(etac conjE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	21	(etac conjE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	22	(rtac antisym_less 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	23	(rtac mp 1),((etac allE 1) THEN (atac 1) THEN (atac 1)),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	24	(rtac mp 1),((etac allE 1) THEN (atac 1) THEN (atac 1))
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	25	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	26
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	27	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	28	(* chains are monotone functions *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	29	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	30
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	31	qed_goalw "chain_mono" thy [is_chain] "is_chain F ==> x<y --> F x<<F y"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	32	( fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	33	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	34	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	35	(nat_ind_tac "y" 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	36	(rtac impI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	37	(etac less_zeroE 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1886 diff changeset	38	(stac less_Suc_eq 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	39	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	40	(etac disjE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	41	(rtac trans_less 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	42	(etac allE 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	43	(atac 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	44	(fast_tac HOL_cs 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	45	(hyp_subst_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	46	(etac allE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	47	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	48	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	49
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	50	qed_goal "chain_mono3" thy "[\| is_chain F; x <= y \|] ==> F x << F y"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	51	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	52	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	53	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	54	(rtac (le_imp_less_or_eq RS disjE) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	55	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	56	(etac (chain_mono RS mp) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	57	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	58	(hyp_subst_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	59	(rtac refl_less 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	60	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	61
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	62
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	63	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	64	(* The range of a chain is a totaly ordered << *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	65	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	66
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	67	qed_goalw "chain_is_tord" thy [is_tord]
1886 0922b597b53d Redefining "range" as a macro -- new proof needed paulson parents: 1779 diff changeset	68	"!!F. is_chain(F) ==> is_tord(range(F))"
0922b597b53d Redefining "range" as a macro -- new proof needed paulson parents: 1779 diff changeset	69	(fn _ =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	70	[
3724 f33e301a89f5 Step_tac -> Safe_tac paulson parents: 3026 diff changeset	71	Safe_tac,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	72	(rtac nat_less_cases 1),
1886 0922b597b53d Redefining "range" as a macro -- new proof needed paulson parents: 1779 diff changeset	73	(ALLGOALS (fast_tac (!claset addIs [refl_less, chain_mono RS mp])))]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	74
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	75	(* ------------------------------------------------------------------------ *)
625 119391dd1d59 New version nipkow parents: 442 diff changeset	76	(* technical lemmas about lub and is_lub *)
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	77	(* ------------------------------------------------------------------------ *)
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	78	bind_thm("lub",lub_def RS meta_eq_to_obj_eq);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	79
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	80	qed_goal "lubI" thy "? x. M <<\| x ==> M <<\| lub(M)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	81	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	82	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	83	(cut_facts_tac prems 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1886 diff changeset	84	(stac lub 1),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	85	(etac (select_eq_Ex RS iffD2) 1)
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	86	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	87
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	88	qed_goal "lubE" thy "M <<\| lub(M) ==> ? x. M <<\| x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	89	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	90	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	91	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	92	(etac exI 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	93	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	94
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	95	qed_goal "lub_eq" thy "(? x. M <<\| x) = M <<\| lub(M)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	96	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	97	[
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1886 diff changeset	98	(stac lub 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	99	(rtac (select_eq_Ex RS subst) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	100	(rtac refl 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	101	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	102
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	103
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	104	qed_goal "thelubI" thy "M <<\| l ==> lub(M) = l"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	105	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	106	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	107	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	108	(rtac unique_lub 1),
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1886 diff changeset	109	(stac lub 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	110	(etac selectI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	111	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	112	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	113
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	114
2841 c2508f4ab739 Added "discrete" CPOs and modified IMP to use those rather than "lift" nipkow parents: 2640 diff changeset	115	goal thy "lub{x} = x";
3018 e65b60b28341 Ran expandshort paulson parents: 2841 diff changeset	116	by (rtac thelubI 1);
e65b60b28341 Ran expandshort paulson parents: 2841 diff changeset	117	by (simp_tac (!simpset addsimps [is_lub,is_ub]) 1);
2841 c2508f4ab739 Added "discrete" CPOs and modified IMP to use those rather than "lift" nipkow parents: 2640 diff changeset	118	qed "lub_singleton";
c2508f4ab739 Added "discrete" CPOs and modified IMP to use those rather than "lift" nipkow parents: 2640 diff changeset	119	Addsimps [lub_singleton];
c2508f4ab739 Added "discrete" CPOs and modified IMP to use those rather than "lift" nipkow parents: 2640 diff changeset	120
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	121	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	122	(* access to some definition as inference rule *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	123	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	124
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	125	qed_goalw "is_lubE" thy [is_lub]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	126	"S <<\| x ==> S <\| x & (! u. S <\| u --> x << u)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	127	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	128	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	129	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	130	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	131	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	132
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	133	qed_goalw "is_lubI" thy [is_lub]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	134	"S <\| x & (! u. S <\| u --> x << u) ==> S <<\| x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	135	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	136	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	137	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	138	(atac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	139	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	140
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	141	qed_goalw "is_chainE" thy [is_chain] "is_chain F ==> !i. F(i) << F(Suc(i))"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	142	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	143	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	144	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	145	(atac 1)]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	146
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	147	qed_goalw "is_chainI" thy [is_chain] "!i. F i << F(Suc i) ==> is_chain F"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	148	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	149	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	150	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	151	(atac 1)]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	152
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	153	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	154	(* technical lemmas about (least) upper bounds of chains *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	155	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	156
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	157	qed_goalw "ub_rangeE" thy [is_ub] "range S <\| x ==> !i. S(i) << x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	158	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	159	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	160	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	161	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	162	(rtac mp 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	163	(etac spec 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	164	(rtac rangeI 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	165	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	166
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	167	qed_goalw "ub_rangeI" thy [is_ub] "!i. S i << x ==> range S <\| x"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	168	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	169	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	170	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	171	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	172	(etac rangeE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	173	(hyp_subst_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	174	(etac spec 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	175	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	176
1779 1155c06fa956 introduced forgotten bind_thm calls oheimb parents: 1675 diff changeset	177	bind_thm ("is_ub_lub", is_lubE RS conjunct1 RS ub_rangeE RS spec);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	178	(* range(?S1) <<\| ?x1 ==> ?S1(?x) << ?x1 *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	179
1779 1155c06fa956 introduced forgotten bind_thm calls oheimb parents: 1675 diff changeset	180	bind_thm ("is_lub_lub", is_lubE RS conjunct2 RS spec RS mp);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	181	(* [\| ?S3 <<\| ?x3; ?S3 <\| ?x1 \|] ==> ?x3 << ?x1 *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	182
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	183	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	184	(* results about finite chains *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	185	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	186
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	187	qed_goalw "lub_finch1" thy [max_in_chain_def]
ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	188	"[\| is_chain C; max_in_chain i C\|] ==> range C <<\| C i"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	189	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	190	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	191	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	192	(rtac is_lubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	193	(rtac conjI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	194	(rtac ub_rangeI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	195	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	196	(res_inst_tac [("m","i")] nat_less_cases 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	197	(rtac (antisym_less_inverse RS conjunct2) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	198	(etac (disjI1 RS less_or_eq_imp_le RS rev_mp) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	199	(etac spec 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	200	(rtac (antisym_less_inverse RS conjunct2) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	201	(etac (disjI2 RS less_or_eq_imp_le RS rev_mp) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	202	(etac spec 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	203	(etac (chain_mono RS mp) 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	204	(atac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	205	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	206	(etac (ub_rangeE RS spec) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	207	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	208
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	209	qed_goalw "lub_finch2" thy [finite_chain_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	210	"finite_chain(C) ==> range(C) <<\| C(@ i. max_in_chain i C)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	211	(fn prems=>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	212	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	213	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	214	(rtac lub_finch1 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	215	(etac conjunct1 1),
1675 36ba4da350c3 adapted several proofs oheimb parents: 1461 diff changeset	216	(rtac (select_eq_Ex RS iffD2) 1),
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	217	(etac conjunct2 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	218	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	219
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	220
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	221	qed_goal "bin_chain" thy "x<<y ==> is_chain (%i. if i=0 then x else y)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	222	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	223	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	224	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	225	(rtac is_chainI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	226	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	227	(nat_ind_tac "i" 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	228	(Asm_simp_tac 1),
2841 c2508f4ab739 Added "discrete" CPOs and modified IMP to use those rather than "lift" nipkow parents: 2640 diff changeset	229	(Asm_simp_tac 1)
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	230	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	231
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	232	qed_goalw "bin_chainmax" thy [max_in_chain_def,le_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	233	"x<<y ==> max_in_chain (Suc 0) (%i. if (i=0) then x else y)"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	234	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	235	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	236	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	237	(rtac allI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	238	(nat_ind_tac "j" 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	239	(Asm_simp_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	240	(Asm_simp_tac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	241	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	242
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	243	qed_goal "lub_bin_chain" thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	244	"x << y ==> range(%i. if (i=0) then x else y) <<\| y"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	245	(fn prems=>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	246	[ (cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	247	(res_inst_tac [("s","if (Suc 0) = 0 then x else y")] subst 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	248	(rtac lub_finch1 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	249	(etac bin_chain 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	250	(etac bin_chainmax 2),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	251	(Simp_tac 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	252	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	253
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	254	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	255	(* the maximal element in a chain is its lub *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	256	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	257
2640 ee4dfce170a0 Changes of HOLCF from Oscar Slotosch: slotosch parents: 2033 diff changeset	258	qed_goal "lub_chain_maxelem" thy
3842 b55686a7b22c fixed dots; wenzelm parents: 3724 diff changeset	259	"[\|? i. Y i=c;!i. Y i<<c\|] ==> lub(range Y) = c"
1043 ffa68eb2730b adjusted HOLCF for new hyp_subst_tac regensbu parents: 892 diff changeset	260	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	261	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	262	(cut_facts_tac prems 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	263	(rtac thelubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	264	(rtac is_lubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	265	(rtac conjI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	266	(etac ub_rangeI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	267	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	268	(etac exE 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	269	(hyp_subst_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	270	(etac (ub_rangeE RS spec) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	271	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	272
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	273	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	274	(* the lub of a constant chain is the constant *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	275	(* ------------------------------------------------------------------------ *)
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	276
3842 b55686a7b22c fixed dots; wenzelm parents: 3724 diff changeset	277	qed_goal "lub_const" thy "range(%x. c) <<\| c"
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	278	(fn prems =>
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	279	[
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	280	(rtac is_lubI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	281	(rtac conjI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	282	(rtac ub_rangeI 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	283	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	284	(rtac refl_less 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	285	(strip_tac 1),
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	286	(etac (ub_rangeE RS spec) 1)
6bcb44e4d6e5 expanded tabs clasohm parents: 1267 diff changeset	287	]);
243 c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	288
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	289
c22b85994e17 Franz Regensburger's Higher-Order Logic of Computable Functions embedding LCF nipkow parents: diff changeset	290

author	wenzelm
	Wed, 29 Oct 1997 16:03:19 +0100
changeset 4031	42cbf6256d60
parent 3842	b55686a7b22c
child 4098	71e05eb27fb6
permissions	-rw-r--r--