isabelle: src/HOL/Metis_Examples/Tarski.thy@50a7e97fe653 (annotated)

41141 ad923cdd4a5d added example to exercise higher-order reasoning with Sledgehammer and Metis blanchet parents: 38991 diff changeset	1	(* Title: HOL/Metis_Examples/Tarski.thy
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	2	Author: Lawrence C. Paulson, Cambridge University Computer Laboratory
41144 509e51b7509a example tuning blanchet parents: 41141 diff changeset	3	Author: Jasmin Blanchette, TU Muenchen
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	4
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	5	Metis example featuring the full theorem of Tarski.
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	6	*)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	7
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	8	header {* Metis Example Featuring the Full Theorem of Tarski *}
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	9
27368 9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	10	theory Tarski
41413 64cd30d6b0b8 explicit file specifications -- avoid secondary load path; wenzelm parents: 41144 diff changeset	11	imports Main "~~/src/HOL/Library/FuncSet"
27368 9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	12	begin
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	13
42103 6066a35f6678 Metis examples use the new Skolemizer to test it blanchet parents: 41413 diff changeset	14	declare [[metis_new_skolemizer]]
6066a35f6678 Metis examples use the new Skolemizer to test it blanchet parents: 41413 diff changeset	15
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	16	(*Many of these higher-order problems appear to be impossible using the
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	17	current linkup. They often seem to need either higher-order unification
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	18	or explicit reasoning about connectives such as conjunction. The numerous
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	19	set comprehensions are to blame.*)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	20
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	21	record 'a potype =
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	22	pset :: "'a set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	23	order :: "('a * 'a) set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	24
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	25	definition monotone :: "['a => 'a, 'a set, ('a *'a)set] => bool" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	26	"monotone f A r == \<forall>x\<in>A. \<forall>y\<in>A. (x, y): r --> ((f x), (f y)) : r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	27
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	28	definition least :: "['a => bool, 'a potype] => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	29	"least P po == @ x. x: pset po & P x &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	30	(\<forall>y \<in> pset po. P y --> (x,y): order po)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	31
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	32	definition greatest :: "['a => bool, 'a potype] => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	33	"greatest P po == @ x. x: pset po & P x &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	34	(\<forall>y \<in> pset po. P y --> (y,x): order po)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	35
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	36	definition lub :: "['a set, 'a potype] => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	37	"lub S po == least (%x. \<forall>y\<in>S. (y,x): order po) po"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	38
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	39	definition glb :: "['a set, 'a potype] => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	40	"glb S po == greatest (%x. \<forall>y\<in>S. (x,y): order po) po"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	41
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	42	definition isLub :: "['a set, 'a potype, 'a] => bool" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	43	"isLub S po == %L. (L: pset po & (\<forall>y\<in>S. (y,L): order po) &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	44	(\<forall>z\<in>pset po. (\<forall>y\<in>S. (y,z): order po) --> (L,z): order po))"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	45
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	46	definition isGlb :: "['a set, 'a potype, 'a] => bool" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	47	"isGlb S po == %G. (G: pset po & (\<forall>y\<in>S. (G,y): order po) &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	48	(\<forall>z \<in> pset po. (\<forall>y\<in>S. (z,y): order po) --> (z,G): order po))"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	49
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	50	definition "fix" :: "[('a => 'a), 'a set] => 'a set" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	51	"fix f A == {x. x: A & f x = x}"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	52
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	53	definition interval :: "[('a*'a) set,'a, 'a ] => 'a set" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	54	"interval r a b == {x. (a,x): r & (x,b): r}"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	55
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	56	definition Bot :: "'a potype => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	57	"Bot po == least (%x. True) po"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	58
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	59	definition Top :: "'a potype => 'a" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	60	"Top po == greatest (%x. True) po"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	61
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	62	definition PartialOrder :: "('a potype) set" where
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	63	"PartialOrder == {P. refl_on (pset P) (order P) & antisym (order P) &
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	64	trans (order P)}"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	65
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	66	definition CompleteLattice :: "('a potype) set" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	67	"CompleteLattice == {cl. cl: PartialOrder &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	68	(\<forall>S. S \<subseteq> pset cl --> (\<exists>L. isLub S cl L)) &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	69	(\<forall>S. S \<subseteq> pset cl --> (\<exists>G. isGlb S cl G))}"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	70
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	71	definition induced :: "['a set, ('a * 'a) set] => ('a *'a)set" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	72	"induced A r == {(a,b). a : A & b: A & (a,b): r}"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	73
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	74	definition sublattice :: "('a potype * 'a set)set" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	75	"sublattice ==
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	76	SIGMA cl: CompleteLattice.
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	77	{S. S \<subseteq> pset cl &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	78	(\| pset = S, order = induced S (order cl) \|): CompleteLattice }"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	79
35054 a5db9779b026 modernized some syntax translations; wenzelm parents: 33027 diff changeset	80	abbreviation
a5db9779b026 modernized some syntax translations; wenzelm parents: 33027 diff changeset	81	sublattice_syntax :: "['a set, 'a potype] => bool" ("_ <<= _" [51, 50] 50)
a5db9779b026 modernized some syntax translations; wenzelm parents: 33027 diff changeset	82	where "S <<= cl \<equiv> S : sublattice `` {cl}"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	83
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 35054 diff changeset	84	definition dual :: "'a potype => 'a potype" where
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	85	"dual po == (\| pset = pset po, order = converse (order po) \|)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	86
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	87	locale PO =
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	88	fixes cl :: "'a potype"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	89	and A :: "'a set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	90	and r :: "('a * 'a) set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	91	assumes cl_po: "cl : PartialOrder"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	92	defines A_def: "A == pset cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	93	and r_def: "r == order cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	94
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	95	locale CL = PO +
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	96	assumes cl_co: "cl : CompleteLattice"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	97
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	98	definition CLF_set :: "('a potype * ('a => 'a)) set" where
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	99	"CLF_set = (SIGMA cl: CompleteLattice.
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	100	{f. f: pset cl -> pset cl & monotone f (pset cl) (order cl)})"
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	101
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	102	locale CLF = CL +
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	103	fixes f :: "'a => 'a"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	104	and P :: "'a set"
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	105	assumes f_cl: "(cl,f) : CLF_set" (was the equivalent "f : CLF``{cl}")
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	106	defines P_def: "P == fix f A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	107
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	108	locale Tarski = CLF +
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	109	fixes Y :: "'a set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	110	and intY1 :: "'a set"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	111	and v :: "'a"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	112	assumes
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	113	Y_ss: "Y \<subseteq> P"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	114	defines
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	115	intY1_def: "intY1 == interval r (lub Y cl) (Top cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	116	and v_def: "v == glb {x. ((%x: intY1. f x) x, x): induced intY1 r &
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	117	x: intY1}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	118	(\| pset=intY1, order=induced intY1 r\|)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	119
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	120	subsection {* Partial Order *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	121
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	122	lemma (in PO) PO_imp_refl_on: "refl_on A r"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	123	apply (insert cl_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	124	apply (simp add: PartialOrder_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	125	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	126
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	127	lemma (in PO) PO_imp_sym: "antisym r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	128	apply (insert cl_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	129	apply (simp add: PartialOrder_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	130	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	131
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	132	lemma (in PO) PO_imp_trans: "trans r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	133	apply (insert cl_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	134	apply (simp add: PartialOrder_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	135	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	136
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	137	lemma (in PO) reflE: "x \<in> A ==> (x, x) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	138	apply (insert cl_po)
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	139	apply (simp add: PartialOrder_def refl_on_def A_def r_def)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	140	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	141
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	142	lemma (in PO) antisymE: "[\| (a, b) \<in> r; (b, a) \<in> r \|] ==> a = b"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	143	apply (insert cl_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	144	apply (simp add: PartialOrder_def antisym_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	145	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	146
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	147	lemma (in PO) transE: "[\| (a, b) \<in> r; (b, c) \<in> r\|] ==> (a,c) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	148	apply (insert cl_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	149	apply (simp add: PartialOrder_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	150	apply (unfold trans_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	151	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	152
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	153	lemma (in PO) monotoneE:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	154	"[\| monotone f A r; x \<in> A; y \<in> A; (x, y) \<in> r \|] ==> (f x, f y) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	155	by (simp add: monotone_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	156
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	157	lemma (in PO) po_subset_po:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	158	"S \<subseteq> A ==> (\| pset = S, order = induced S r \|) \<in> PartialOrder"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	159	apply (simp (no_asm) add: PartialOrder_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	160	apply auto
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	161	-- {* refl *}
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	162	apply (simp add: refl_on_def induced_def)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	163	apply (blast intro: reflE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	164	-- {* antisym *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	165	apply (simp add: antisym_def induced_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	166	apply (blast intro: antisymE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	167	-- {* trans *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	168	apply (simp add: trans_def induced_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	169	apply (blast intro: transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	170	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	171
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	172	lemma (in PO) indE: "[\| (x, y) \<in> induced S r; S \<subseteq> A \|] ==> (x, y) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	173	by (simp add: add: induced_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	174
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	175	lemma (in PO) indI: "[\| (x, y) \<in> r; x \<in> S; y \<in> S \|] ==> (x, y) \<in> induced S r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	176	by (simp add: add: induced_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	177
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	178	lemma (in CL) CL_imp_ex_isLub: "S \<subseteq> A ==> \<exists>L. isLub S cl L"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	179	apply (insert cl_co)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	180	apply (simp add: CompleteLattice_def A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	181	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	182
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	183	declare (in CL) cl_co [simp]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	184
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	185	lemma isLub_lub: "(\<exists>L. isLub S cl L) = isLub S cl (lub S cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	186	by (simp add: lub_def least_def isLub_def some_eq_ex [symmetric])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	187
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	188	lemma isGlb_glb: "(\<exists>G. isGlb S cl G) = isGlb S cl (glb S cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	189	by (simp add: glb_def greatest_def isGlb_def some_eq_ex [symmetric])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	190
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	191	lemma isGlb_dual_isLub: "isGlb S cl = isLub S (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	192	by (simp add: isLub_def isGlb_def dual_def converse_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	193
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	194	lemma isLub_dual_isGlb: "isLub S cl = isGlb S (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	195	by (simp add: isLub_def isGlb_def dual_def converse_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	196
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	197	lemma (in PO) dualPO: "dual cl \<in> PartialOrder"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	198	apply (insert cl_po)
45970 b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	199	apply (simp add: PartialOrder_def dual_def)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	200	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	201
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	202	lemma Rdual:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	203	"\<forall>S. (S \<subseteq> A -->( \<exists>L. isLub S (\| pset = A, order = r\|) L))
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	204	==> \<forall>S. (S \<subseteq> A --> (\<exists>G. isGlb S (\| pset = A, order = r\|) G))"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	205	apply safe
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	206	apply (rule_tac x = "lub {y. y \<in> A & (\<forall>k \<in> S. (y, k) \<in> r)}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	207	(\|pset = A, order = r\|) " in exI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	208	apply (drule_tac x = "{y. y \<in> A & (\<forall>k \<in> S. (y,k) \<in> r) }" in spec)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	209	apply (drule mp, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	210	apply (simp add: isLub_lub isGlb_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	211	apply (simp add: isLub_def, blast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	212	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	213
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	214	lemma lub_dual_glb: "lub S cl = glb S (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	215	by (simp add: lub_def glb_def least_def greatest_def dual_def converse_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	216
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	217	lemma glb_dual_lub: "glb S cl = lub S (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	218	by (simp add: lub_def glb_def least_def greatest_def dual_def converse_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	219
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	220	lemma CL_subset_PO: "CompleteLattice \<subseteq> PartialOrder"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	221	by (simp add: PartialOrder_def CompleteLattice_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	222
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	223	lemmas CL_imp_PO = CL_subset_PO [THEN subsetD]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	224
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	225	declare PO.PO_imp_refl_on [OF PO.intro [OF CL_imp_PO], simp]
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	226	declare PO.PO_imp_sym [OF PO.intro [OF CL_imp_PO], simp]
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	227	declare PO.PO_imp_trans [OF PO.intro [OF CL_imp_PO], simp]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	228
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	229	lemma (in CL) CO_refl_on: "refl_on A r"
922f944f03b2 name changes nipkow parents: 28592 diff changeset	230	by (rule PO_imp_refl_on)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	231
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	232	lemma (in CL) CO_antisym: "antisym r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	233	by (rule PO_imp_sym)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	234
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	235	lemma (in CL) CO_trans: "trans r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	236	by (rule PO_imp_trans)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	237
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	238	lemma CompleteLatticeI:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	239	"[\| po \<in> PartialOrder; (\<forall>S. S \<subseteq> pset po --> (\<exists>L. isLub S po L));
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	240	(\<forall>S. S \<subseteq> pset po --> (\<exists>G. isGlb S po G))\|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	241	==> po \<in> CompleteLattice"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	242	apply (unfold CompleteLattice_def, blast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	243	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	244
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	245	lemma (in CL) CL_dualCL: "dual cl \<in> CompleteLattice"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	246	apply (insert cl_co)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	247	apply (simp add: CompleteLattice_def dual_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	248	apply (fold dual_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	249	apply (simp add: isLub_dual_isGlb [symmetric] isGlb_dual_isLub [symmetric]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	250	dualPO)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	251	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	252
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	253	lemma (in PO) dualA_iff: "pset (dual cl) = pset cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	254	by (simp add: dual_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	255
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	256	lemma (in PO) dualr_iff: "((x, y) \<in> (order(dual cl))) = ((y, x) \<in> order cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	257	by (simp add: dual_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	258
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	259	lemma (in PO) monotone_dual:
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	260	"monotone f (pset cl) (order cl)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	261	==> monotone f (pset (dual cl)) (order(dual cl))"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	262	by (simp add: monotone_def dualA_iff dualr_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	263
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	264	lemma (in PO) interval_dual:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	265	"[\| x \<in> A; y \<in> A\|] ==> interval r x y = interval (order(dual cl)) y x"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	266	apply (simp add: interval_def dualr_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	267	apply (fold r_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	268	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	269
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	270	lemma (in PO) interval_not_empty:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	271	"[\| trans r; interval r a b \<noteq> {} \|] ==> (a, b) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	272	apply (simp add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	273	apply (unfold trans_def, blast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	274	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	275
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	276	lemma (in PO) interval_imp_mem: "x \<in> interval r a b ==> (a, x) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	277	by (simp add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	278
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	279	lemma (in PO) left_in_interval:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	280	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {} \|] ==> a \<in> interval r a b"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	281	apply (simp (no_asm_simp) add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	282	apply (simp add: PO_imp_trans interval_not_empty)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	283	apply (simp add: reflE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	284	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	285
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	286	lemma (in PO) right_in_interval:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	287	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {} \|] ==> b \<in> interval r a b"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	288	apply (simp (no_asm_simp) add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	289	apply (simp add: PO_imp_trans interval_not_empty)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	290	apply (simp add: reflE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	291	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	292
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	293	subsection {* sublattice *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	294
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	295	lemma (in PO) sublattice_imp_CL:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	296	"S <<= cl ==> (\| pset = S, order = induced S r \|) \<in> CompleteLattice"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	297	by (simp add: sublattice_def CompleteLattice_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	298
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	299	lemma (in CL) sublatticeI:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	300	"[\| S \<subseteq> A; (\| pset = S, order = induced S r \|) \<in> CompleteLattice \|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	301	==> S <<= cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	302	by (simp add: sublattice_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	303
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	304	subsection {* lub *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	305
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	306	lemma (in CL) lub_unique: "[\| S \<subseteq> A; isLub S cl x; isLub S cl L\|] ==> x = L"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	307	apply (rule antisymE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	308	apply (auto simp add: isLub_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	309	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	310
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	311	lemma (in CL) lub_upper: "[\|S \<subseteq> A; x \<in> S\|] ==> (x, lub S cl) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	312	apply (rule CL_imp_ex_isLub [THEN exE], assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	313	apply (unfold lub_def least_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	314	apply (rule some_equality [THEN ssubst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	315	apply (simp add: isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	316	apply (simp add: lub_unique A_def isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	317	apply (simp add: isLub_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	318	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	319
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	320	lemma (in CL) lub_least:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	321	"[\| S \<subseteq> A; L \<in> A; \<forall>x \<in> S. (x,L) \<in> r \|] ==> (lub S cl, L) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	322	apply (rule CL_imp_ex_isLub [THEN exE], assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	323	apply (unfold lub_def least_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	324	apply (rule_tac s=x in some_equality [THEN ssubst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	325	apply (simp add: isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	326	apply (simp add: lub_unique A_def isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	327	apply (simp add: isLub_def r_def A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	328	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	329
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	330	lemma (in CL) lub_in_lattice: "S \<subseteq> A ==> lub S cl \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	331	apply (rule CL_imp_ex_isLub [THEN exE], assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	332	apply (unfold lub_def least_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	333	apply (subst some_equality)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	334	apply (simp add: isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	335	prefer 2 apply (simp add: isLub_def A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	336	apply (simp add: lub_unique A_def isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	337	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	338
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	339	lemma (in CL) lubI:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	340	"[\| S \<subseteq> A; L \<in> A; \<forall>x \<in> S. (x,L) \<in> r;
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	341	\<forall>z \<in> A. (\<forall>y \<in> S. (y,z) \<in> r) --> (L,z) \<in> r \|] ==> L = lub S cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	342	apply (rule lub_unique, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	343	apply (simp add: isLub_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	344	apply (unfold isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	345	apply (rule conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	346	apply (fold A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	347	apply (rule lub_in_lattice, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	348	apply (simp add: lub_upper lub_least)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	349	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	350
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	351	lemma (in CL) lubIa: "[\| S \<subseteq> A; isLub S cl L \|] ==> L = lub S cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	352	by (simp add: lubI isLub_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	353
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	354	lemma (in CL) isLub_in_lattice: "isLub S cl L ==> L \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	355	by (simp add: isLub_def A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	356
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	357	lemma (in CL) isLub_upper: "[\|isLub S cl L; y \<in> S\|] ==> (y, L) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	358	by (simp add: isLub_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	359
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	360	lemma (in CL) isLub_least:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	361	"[\| isLub S cl L; z \<in> A; \<forall>y \<in> S. (y, z) \<in> r\|] ==> (L, z) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	362	by (simp add: isLub_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	363
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	364	lemma (in CL) isLubI:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	365	"[\| L \<in> A; \<forall>y \<in> S. (y, L) \<in> r;
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	366	(\<forall>z \<in> A. (\<forall>y \<in> S. (y, z):r) --> (L, z) \<in> r)\|] ==> isLub S cl L"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	367	by (simp add: isLub_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	368
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	369	subsection {* glb *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	370
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	371	lemma (in CL) glb_in_lattice: "S \<subseteq> A ==> glb S cl \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	372	apply (subst glb_dual_lub)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	373	apply (simp add: A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	374	apply (rule dualA_iff [THEN subst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	375	apply (rule CL.lub_in_lattice)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	376	apply (rule CL.intro)
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	377	apply (rule PO.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	378	apply (rule dualPO)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	379	apply (rule CL_axioms.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	380	apply (rule CL_dualCL)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	381	apply (simp add: dualA_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	382	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	383
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	384	lemma (in CL) glb_lower: "[\|S \<subseteq> A; x \<in> S\|] ==> (glb S cl, x) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	385	apply (subst glb_dual_lub)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	386	apply (simp add: r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	387	apply (rule dualr_iff [THEN subst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	388	apply (rule CL.lub_upper)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	389	apply (rule CL.intro)
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	390	apply (rule PO.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	391	apply (rule dualPO)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	392	apply (rule CL_axioms.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	393	apply (rule CL_dualCL)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	394	apply (simp add: dualA_iff A_def, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	395	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	396
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	397	text {*
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	398	Reduce the sublattice property by using substructural properties;
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	399	abandoned see @{text "Tarski_4.ML"}.
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	400	*}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	401
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	402	declare (in CLF) f_cl [simp]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	403
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	404	lemma (in CLF) [simp]:
42762 0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	405	"f: pset cl -> pset cl & monotone f (pset cl) (order cl)"
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	406	proof -
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	407	have "\<forall>u v. (v, u) \<in> CLF_set \<longrightarrow> u \<in> {R \<in> pset v \<rightarrow> pset v. monotone R (pset v) (order v)}"
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	408	unfolding CLF_set_def using SigmaE2 by blast
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	409	hence F1: "\<forall>u v. (v, u) \<in> CLF_set \<longrightarrow> u \<in> pset v \<rightarrow> pset v \<and> monotone u (pset v) (order v)"
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	410	using CollectE by blast
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	411	hence "Tarski.monotone f (pset cl) (order cl)" by (metis f_cl)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	412	hence "(cl, f) \<in> CLF_set \<and> Tarski.monotone f (pset cl) (order cl)"
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	413	by (metis f_cl)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	414	thus "f \<in> pset cl \<rightarrow> pset cl \<and> Tarski.monotone f (pset cl) (order cl)"
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	415	using F1 by metis
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	416	qed
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	417
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	418	lemma (in CLF) f_in_funcset: "f \<in> A -> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	419	by (simp add: A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	420
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	421	lemma (in CLF) monotone_f: "monotone f A r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	422	by (simp add: A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	423
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	424	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	425
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	426	declare (in CLF) CLF_set_def [simp] CL_dualCL [simp] monotone_dual [simp] dualA_iff [simp]
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	427
42762 0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	428	lemma (in CLF) CLF_dual: "(dual cl, f) \<in> CLF_set"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	429	apply (simp del: dualA_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	430	apply (simp)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	431	done
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	432
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	433	declare (in CLF) CLF_set_def[simp del] CL_dualCL[simp del] monotone_dual[simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	434	dualA_iff[simp del]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	435
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	436	subsection {* fixed points *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	437
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	438	lemma fix_subset: "fix f A \<subseteq> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	439	by (simp add: fix_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	440
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	441	lemma fix_imp_eq: "x \<in> fix f A ==> f x = x"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	442	by (simp add: fix_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	443
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	444	lemma fixf_subset:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	445	"[\| A \<subseteq> B; x \<in> fix (%y: A. f y) A \|] ==> x \<in> fix f B"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	446	by (simp add: fix_def, auto)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	447
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	448	subsection {* lemmas for Tarski, lub *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	449
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	450	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	451
a25ff4283352 tuning blanchet parents: 43197 diff changeset	452	declare CL.lub_least[intro] CLF.f_in_funcset[intro] funcset_mem[intro] CL.lub_in_lattice[intro] PO.transE[intro] PO.monotoneE[intro] CLF.monotone_f[intro] CL.lub_upper[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	453
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	454	lemma (in CLF) lubH_le_flubH:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	455	"H = {x. (x, f x) \<in> r & x \<in> A} ==> (lub H cl, f (lub H cl)) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	456	apply (rule lub_least, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	457	apply (rule f_in_funcset [THEN funcset_mem])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	458	apply (rule lub_in_lattice, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	459	-- {* @{text "\<forall>x:H. (x, f (lub H r)) \<in> r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	460	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	461	(never proved, 2007-01-22)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	462	apply (rule transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	463	-- {* instantiates @{text "(x, ?z) \<in> order cl to (x, f x)"}, *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	464	-- {* because of the def of @{text H} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	465	apply fast
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	466	-- {* so it remains to show @{text "(f x, f (lub H cl)) \<in> r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	467	apply (rule_tac f = "f" in monotoneE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	468	apply (rule monotone_f, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	469	apply (rule lub_in_lattice, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	470	apply (rule lub_upper, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	471	apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	472	done
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	473
a25ff4283352 tuning blanchet parents: 43197 diff changeset	474	declare CL.lub_least[rule del] CLF.f_in_funcset[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	475	funcset_mem[rule del] CL.lub_in_lattice[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	476	PO.transE[rule del] PO.monotoneE[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	477	CLF.monotone_f[rule del] CL.lub_upper[rule del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	478
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	479	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	480
a25ff4283352 tuning blanchet parents: 43197 diff changeset	481	declare CLF.f_in_funcset[intro] funcset_mem[intro] CL.lub_in_lattice[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	482	PO.monotoneE[intro] CLF.monotone_f[intro] CL.lub_upper[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	483	CLF.lubH_le_flubH[simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	484
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	485	lemma (in CLF) flubH_le_lubH:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	486	"[\| H = {x. (x, f x) \<in> r & x \<in> A} \|] ==> (f (lub H cl), lub H cl) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	487	apply (rule lub_upper, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	488	apply (rule_tac t = "H" in ssubst, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	489	apply (rule CollectI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	490	apply (rule conjI)
24827 646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	491	(*??no longer terminates, with combinators
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	492	apply (metis CO_refl_on lubH_le_flubH monotone_def monotone_f reflD1 reflD2)
24827 646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	493	*)
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	494	apply (metis CO_refl_on lubH_le_flubH monotoneE [OF monotone_f] refl_onD1 refl_onD2)
922f944f03b2 name changes nipkow parents: 28592 diff changeset	495	apply (metis CO_refl_on lubH_le_flubH refl_onD2)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	496	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	497
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	498	declare CLF.f_in_funcset[rule del] funcset_mem[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	499	CL.lub_in_lattice[rule del] PO.monotoneE[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	500	CLF.monotone_f[rule del] CL.lub_upper[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	501	CLF.lubH_le_flubH[simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	502
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	503	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	504
37622 b3f572839570 no setup is necessary anymore blanchet parents: 36554 diff changeset	505	(* Single-step version fails. The conjecture clauses refer to local abstraction
b3f572839570 no setup is necessary anymore blanchet parents: 36554 diff changeset	506	functions (Frees). *)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	507	lemma (in CLF) lubH_is_fixp:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	508	"H = {x. (x, f x) \<in> r & x \<in> A} ==> lub H cl \<in> fix f A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	509	apply (simp add: fix_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	510	apply (rule conjI)
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	511	proof -
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	512	assume A1: "H = {x. (x, f x) \<in> r \<and> x \<in> A}"
42762 0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	513	have F1: "\<forall>u v. v \<inter> u \<subseteq> u" by (metis Int_commute Int_lower1)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	514	have "{R. (R, f R) \<in> r} \<inter> {R. R \<in> A} = H" using A1 by (metis Collect_conj_eq)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	515	hence "H \<subseteq> {R. R \<in> A}" using F1 by metis
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	516	hence "H \<subseteq> A" by (metis Collect_mem_eq)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	517	hence "lub H cl \<in> A" by (metis lub_in_lattice)
0b3c3cf28218 prove one more lemma using Sledgehammer, with some guidance, and replace clumsy old proof that relied on old extensionality behavior blanchet parents: 42103 diff changeset	518	thus "lub {x. (x, f x) \<in> r \<and> x \<in> A} cl \<in> A" using A1 by metis
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	519	next
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	520	assume A1: "H = {x. (x, f x) \<in> r \<and> x \<in> A}"
45970 b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	521	have F1: "\<forall>v. {R. R \<in> v} = v" by (metis Collect_mem_eq)
b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	522	have F2: "\<forall>w u. {R. R \<in> u \<and> R \<in> w} = u \<inter> w"
b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	523	by (metis Collect_conj_eq Collect_mem_eq)
b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	524	have F3: "\<forall>x v. {R. v R \<in> x} = v -` x" by (metis vimage_def)
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	525	hence F4: "A \<inter> (\<lambda>R. (R, f R)) -` r = H" using A1 by auto
45970 b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	526	hence F5: "(f (lub H cl), lub H cl) \<in> r"
b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	527	by (metis A1 flubH_le_lubH)
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	528	have F6: "(lub H cl, f (lub H cl)) \<in> r"
45970 b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	529	by (metis A1 lubH_le_flubH)
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	530	have "(lub H cl, f (lub H cl)) \<in> r \<longrightarrow> f (lub H cl) = lub H cl"
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	531	using F5 by (metis antisymE)
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	532	hence "f (lub H cl) = lub H cl" using F6 by metis
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	533	thus "H = {x. (x, f x) \<in> r \<and> x \<in> A}
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	534	\<Longrightarrow> f (lub {x. (x, f x) \<in> r \<and> x \<in> A} cl) =
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	535	lub {x. (x, f x) \<in> r \<and> x \<in> A} cl"
45970 b6d0cff57d96 adjusted to set/pred distinction by means of type constructor `set` haftmann parents: 45705 diff changeset	536	by metis
24827 646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	537	qed
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	538
25710 4cdf7de81e1b Replaced refs by config params; finer critical section in mets method paulson parents: 24855 diff changeset	539	lemma (in CLF) (lubH_is_fixp:)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	540	"H = {x. (x, f x) \<in> r & x \<in> A} ==> lub H cl \<in> fix f A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	541	apply (simp add: fix_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	542	apply (rule conjI)
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	543	apply (metis CO_refl_on lubH_le_flubH refl_onD1)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	544	apply (metis antisymE flubH_le_lubH lubH_le_flubH)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	545	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	546
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	547	lemma (in CLF) fix_in_H:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	548	"[\| H = {x. (x, f x) \<in> r & x \<in> A}; x \<in> P \|] ==> x \<in> H"
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	549	by (simp add: P_def fix_imp_eq [of _ f A] reflE CO_refl_on
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	550	fix_subset [of f A, THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	551
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	552	lemma (in CLF) fixf_le_lubH:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	553	"H = {x. (x, f x) \<in> r & x \<in> A} ==> \<forall>x \<in> fix f A. (x, lub H cl) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	554	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	555	apply (rule lub_upper, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	556	apply (rule fix_in_H)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	557	apply (simp_all add: P_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	558	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	559
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	560	lemma (in CLF) lubH_least_fixf:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	561	"H = {x. (x, f x) \<in> r & x \<in> A}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	562	==> \<forall>L. (\<forall>y \<in> fix f A. (y,L) \<in> r) --> (lub H cl, L) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	563	apply (metis P_def lubH_is_fixp)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	564	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	565
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	566	subsection {* Tarski fixpoint theorem 1, first part *}
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	567
a25ff4283352 tuning blanchet parents: 43197 diff changeset	568	declare CL.lubI[intro] fix_subset[intro] CL.lub_in_lattice[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	569	CLF.fixf_le_lubH[simp] CLF.lubH_least_fixf[simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	570
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	571	lemma (in CLF) T_thm_1_lub: "lub P cl = lub {x. (x, f x) \<in> r & x \<in> A} cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	572	(sledgehammer;)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	573	apply (rule sym)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	574	apply (simp add: P_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	575	apply (rule lubI)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	576	apply (metis P_def fix_subset)
24827 646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	577	apply (metis Collect_conj_eq Collect_mem_eq Int_commute Int_lower1 lub_in_lattice vimage_def)
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	578	(*??no longer terminates, with combinators
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	579	apply (metis P_def fix_def fixf_le_lubH)
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	580	apply (metis P_def fix_def lubH_least_fixf)
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	581	*)
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	582	apply (simp add: fixf_le_lubH)
646bdc51eb7d combinator translation paulson parents: 24545 diff changeset	583	apply (simp add: lubH_least_fixf)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	584	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	585
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	586	declare CL.lubI[rule del] fix_subset[rule del] CL.lub_in_lattice[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	587	CLF.fixf_le_lubH[simp del] CLF.lubH_least_fixf[simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	588
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	589	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	590
a25ff4283352 tuning blanchet parents: 43197 diff changeset	591	declare glb_dual_lub[simp] PO.dualA_iff[intro] CLF.lubH_is_fixp[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	592	PO.dualPO[intro] CL.CL_dualCL[intro] PO.dualr_iff[simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	593
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	594	lemma (in CLF) glbH_is_fixp: "H = {x. (f x, x) \<in> r & x \<in> A} ==> glb H cl \<in> P"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	595	-- {* Tarski for glb *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	596	(sledgehammer;)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	597	apply (simp add: glb_dual_lub P_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	598	apply (rule dualA_iff [THEN subst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	599	apply (rule CLF.lubH_is_fixp)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	600	apply (rule CLF.intro)
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	601	apply (rule CL.intro)
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	602	apply (rule PO.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	603	apply (rule dualPO)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	604	apply (rule CL_axioms.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	605	apply (rule CL_dualCL)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	606	apply (rule CLF_axioms.intro)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	607	apply (rule CLF_dual)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	608	apply (simp add: dualr_iff dualA_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	609	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	610
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	611	declare glb_dual_lub[simp del] PO.dualA_iff[rule del] CLF.lubH_is_fixp[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	612	PO.dualPO[rule del] CL.CL_dualCL[rule del] PO.dualr_iff[simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	613
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	614	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	615
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	616	lemma (in CLF) T_thm_1_glb: "glb P cl = glb {x. (f x, x) \<in> r & x \<in> A} cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	617	(sledgehammer;)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	618	apply (simp add: glb_dual_lub P_def A_def r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	619	apply (rule dualA_iff [THEN subst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	620	(never proved, 2007-01-22)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	621	(sledgehammer;)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	622	apply (simp add: CLF.T_thm_1_lub [of _ f, OF CLF.intro, OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro,
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	623	OF dualPO CL_dualCL] dualPO CL_dualCL CLF_dual dualr_iff)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	624	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	625
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	626	subsection {* interval *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	627
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	628	declare (in CLF) CO_refl_on[simp] refl_on_def [simp]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	629
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	630	lemma (in CLF) rel_imp_elem: "(x, y) \<in> r ==> x \<in> A"
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	631	by (metis CO_refl_on refl_onD1)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	632
a25ff4283352 tuning blanchet parents: 43197 diff changeset	633	declare (in CLF) CO_refl_on[simp del] refl_on_def [simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	634
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	635	declare (in CLF) rel_imp_elem[intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	636	declare interval_def [simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	637
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	638	lemma (in CLF) interval_subset: "[\| a \<in> A; b \<in> A \|] ==> interval r a b \<subseteq> A"
30198 922f944f03b2 name changes nipkow parents: 28592 diff changeset	639	by (metis CO_refl_on interval_imp_mem refl_onD refl_onD2 rel_imp_elem subset_eq)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	640
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	641	declare (in CLF) rel_imp_elem[rule del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	642	declare interval_def [simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	643
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	644	lemma (in CLF) intervalI:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	645	"[\| (a, x) \<in> r; (x, b) \<in> r \|] ==> x \<in> interval r a b"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	646	by (simp add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	647
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	648	lemma (in CLF) interval_lemma1:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	649	"[\| S \<subseteq> interval r a b; x \<in> S \|] ==> (a, x) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	650	by (unfold interval_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	651
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	652	lemma (in CLF) interval_lemma2:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	653	"[\| S \<subseteq> interval r a b; x \<in> S \|] ==> (x, b) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	654	by (unfold interval_def, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	655
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	656	lemma (in CLF) a_less_lub:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	657	"[\| S \<subseteq> A; S \<noteq> {};
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	658	\<forall>x \<in> S. (a,x) \<in> r; \<forall>y \<in> S. (y, L) \<in> r \|] ==> (a,L) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	659	by (blast intro: transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	660
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	661	lemma (in CLF) glb_less_b:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	662	"[\| S \<subseteq> A; S \<noteq> {};
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	663	\<forall>x \<in> S. (x,b) \<in> r; \<forall>y \<in> S. (G, y) \<in> r \|] ==> (G,b) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	664	by (blast intro: transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	665
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	666	lemma (in CLF) S_intv_cl:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	667	"[\| a \<in> A; b \<in> A; S \<subseteq> interval r a b \|]==> S \<subseteq> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	668	by (simp add: subset_trans [OF _ interval_subset])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	669
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	670
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	671	lemma (in CLF) L_in_interval:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	672	"[\| a \<in> A; b \<in> A; S \<subseteq> interval r a b;
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	673	S \<noteq> {}; isLub S cl L; interval r a b \<noteq> {} \|] ==> L \<in> interval r a b"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	674	(*WON'T TERMINATE
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	675	apply (metis CO_trans intervalI interval_lemma1 interval_lemma2 isLub_least isLub_upper subset_empty subset_iff trans_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	676	*)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	677	apply (rule intervalI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	678	apply (rule a_less_lub)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	679	prefer 2 apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	680	apply (simp add: S_intv_cl)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	681	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	682	apply (simp add: interval_lemma1)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	683	apply (simp add: isLub_upper)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	684	-- {* @{text "(L, b) \<in> r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	685	apply (simp add: isLub_least interval_lemma2)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	686	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	687
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	688	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	689
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	690	lemma (in CLF) G_in_interval:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	691	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {}; S \<subseteq> interval r a b; isGlb S cl G;
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	692	S \<noteq> {} \|] ==> G \<in> interval r a b"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	693	apply (simp add: interval_dual)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	694	apply (simp add: CLF.L_in_interval [of _ f, OF CLF.intro, OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	695	dualA_iff A_def dualPO CL_dualCL CLF_dual isGlb_dual_isLub)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	696	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	697
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	698
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	699	lemma (in CLF) intervalPO:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	700	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {} \|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	701	==> (\| pset = interval r a b, order = induced (interval r a b) r \|)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	702	\<in> PartialOrder"
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	703	proof -
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	704	assume A1: "a \<in> A"
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	705	assume "b \<in> A"
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	706	hence "\<forall>u. u \<in> A \<longrightarrow> interval r u b \<subseteq> A" by (metis interval_subset)
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	707	hence "interval r a b \<subseteq> A" using A1 by metis
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	708	hence "interval r a b \<subseteq> A" by metis
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	709	thus ?thesis by (metis po_subset_po)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	710	qed
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	711
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	712	lemma (in CLF) intv_CL_lub:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	713	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {} \|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	714	==> \<forall>S. S \<subseteq> interval r a b -->
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	715	(\<exists>L. isLub S (\| pset = interval r a b,
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	716	order = induced (interval r a b) r \|) L)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	717	apply (intro strip)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	718	apply (frule S_intv_cl [THEN CL_imp_ex_isLub])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	719	prefer 2 apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	720	apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	721	apply (erule exE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	722	-- {* define the lub for the interval as *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	723	apply (rule_tac x = "if S = {} then a else L" in exI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	724	apply (simp (no_asm_simp) add: isLub_def split del: split_if)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	725	apply (intro impI conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	726	-- {* @{text "(if S = {} then a else L) \<in> interval r a b"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	727	apply (simp add: CL_imp_PO L_in_interval)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	728	apply (simp add: left_in_interval)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	729	-- {* lub prop 1 *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	730	apply (case_tac "S = {}")
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	731	-- {* @{text "S = {}, y \<in> S = False => everything"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	732	apply fast
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	733	-- {* @{text "S \<noteq> {}"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	734	apply simp
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	735	-- {* @{text "\<forall>y:S. (y, L) \<in> induced (interval r a b) r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	736	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	737	apply (simp add: induced_def L_in_interval)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	738	apply (rule conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	739	apply (rule subsetD)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	740	apply (simp add: S_intv_cl, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	741	apply (simp add: isLub_upper)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	742	-- {* @{text "\<forall>z:interval r a b. (\<forall>y:S. (y, z) \<in> induced (interval r a b) r \<longrightarrow> (if S = {} then a else L, z) \<in> induced (interval r a b) r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	743	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	744	apply (rule impI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	745	apply (case_tac "S = {}")
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	746	-- {* @{text "S = {}"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	747	apply simp
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	748	apply (simp add: induced_def interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	749	apply (rule conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	750	apply (rule reflE, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	751	apply (rule interval_not_empty)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	752	apply (rule CO_trans)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	753	apply (simp add: interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	754	-- {* @{text "S \<noteq> {}"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	755	apply simp
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	756	apply (simp add: induced_def L_in_interval)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	757	apply (rule isLub_least, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	758	apply (rule subsetD)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	759	prefer 2 apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	760	apply (simp add: S_intv_cl, fast)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	761	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	762
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	763	lemmas (in CLF) intv_CL_glb = intv_CL_lub [THEN Rdual]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	764
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	765	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	766
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	767	lemma (in CLF) interval_is_sublattice:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	768	"[\| a \<in> A; b \<in> A; interval r a b \<noteq> {} \|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	769	==> interval r a b <<= cl"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	770	(sledgehammer )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	771	apply (rule sublatticeI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	772	apply (simp add: interval_subset)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	773	(never proved, 2007-01-22)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	774	(sledgehammer )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	775	apply (rule CompleteLatticeI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	776	apply (simp add: intervalPO)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	777	apply (simp add: intv_CL_lub)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	778	apply (simp add: intv_CL_glb)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	779	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	780
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	781	lemmas (in CLF) interv_is_compl_latt =
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	782	interval_is_sublattice [THEN sublattice_imp_CL]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	783
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	784	subsection {* Top and Bottom *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	785	lemma (in CLF) Top_dual_Bot: "Top cl = Bot (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	786	by (simp add: Top_def Bot_def least_def greatest_def dualA_iff dualr_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	787
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	788	lemma (in CLF) Bot_dual_Top: "Bot cl = Top (dual cl)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	789	by (simp add: Top_def Bot_def least_def greatest_def dualA_iff dualr_iff)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	790
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	791
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	792	lemma (in CLF) Bot_in_lattice: "Bot cl \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	793	(sledgehammer; )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	794	apply (simp add: Bot_def least_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	795	apply (rule_tac a="glb A cl" in someI2)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	796	apply (simp_all add: glb_in_lattice glb_lower
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	797	r_def [symmetric] A_def [symmetric])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	798	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	799
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	800	(first proved 2007-01-25 after relaxing relevance)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	801
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	802	lemma (in CLF) Top_in_lattice: "Top cl \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	803	(sledgehammer;)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	804	apply (simp add: Top_dual_Bot A_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	805	(first proved 2007-01-25 after relaxing relevance)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	806	(sledgehammer)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	807	apply (rule dualA_iff [THEN subst])
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	808	apply (blast intro!: CLF.Bot_in_lattice [OF CLF.intro, OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro] dualPO CL_dualCL CLF_dual)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	809	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	810
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	811	lemma (in CLF) Top_prop: "x \<in> A ==> (x, Top cl) \<in> r"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	812	apply (simp add: Top_def greatest_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	813	apply (rule_tac a="lub A cl" in someI2)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	814	apply (rule someI2)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	815	apply (simp_all add: lub_in_lattice lub_upper
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	816	r_def [symmetric] A_def [symmetric])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	817	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	818
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	819	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	820
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	821	lemma (in CLF) Bot_prop: "x \<in> A ==> (Bot cl, x) \<in> r"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	822	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	823	apply (simp add: Bot_dual_Top r_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	824	apply (rule dualr_iff [THEN subst])
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	825	apply (simp add: CLF.Top_prop [of _ f, OF CLF.intro, OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	826	dualA_iff A_def dualPO CL_dualCL CLF_dual)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	827	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	828
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	829
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	830	lemma (in CLF) Top_intv_not_empty: "x \<in> A ==> interval r x (Top cl) \<noteq> {}"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	831	apply (metis Top_in_lattice Top_prop empty_iff intervalI reflE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	832	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	833
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	834
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	835	lemma (in CLF) Bot_intv_not_empty: "x \<in> A ==> interval r (Bot cl) x \<noteq> {}"
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	836	apply (metis Bot_prop ex_in_conv intervalI reflE rel_imp_elem)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	837	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	838
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	839	subsection {* fixed points form a partial order *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	840
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	841	lemma (in CLF) fixf_po: "(\| pset = P, order = induced P r\|) \<in> PartialOrder"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	842	by (simp add: P_def fix_subset po_subset_po)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	843
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	844	(first proved 2007-01-25 after relaxing relevance)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	845
a25ff4283352 tuning blanchet parents: 43197 diff changeset	846	declare (in Tarski) P_def[simp] Y_ss [simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	847	declare fix_subset [intro] subset_trans [intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	848
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	849	lemma (in Tarski) Y_subset_A: "Y \<subseteq> A"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	850	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	851	apply (rule subset_trans [OF _ fix_subset])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	852	apply (rule Y_ss [simplified P_def])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	853	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	854
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	855	declare (in Tarski) P_def[simp del] Y_ss [simp del]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	856	declare fix_subset [rule del] subset_trans [rule del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	857
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	858	lemma (in Tarski) lubY_in_A: "lub Y cl \<in> A"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	859	by (rule Y_subset_A [THEN lub_in_lattice])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	860
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	861	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	862
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	863	lemma (in Tarski) lubY_le_flubY: "(lub Y cl, f (lub Y cl)) \<in> r"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	864	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	865	apply (rule lub_least)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	866	apply (rule Y_subset_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	867	apply (rule f_in_funcset [THEN funcset_mem])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	868	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	869	-- {* @{text "Y \<subseteq> P ==> f x = x"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	870	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	871	(sledgehammer )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	872	apply (rule_tac t = "x" in fix_imp_eq [THEN subst])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	873	apply (erule Y_ss [simplified P_def, THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	874	-- {* @{text "reduce (f x, f (lub Y cl)) \<in> r to (x, lub Y cl) \<in> r"} by monotonicity *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	875	(sledgehammer)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	876	apply (rule_tac f = "f" in monotoneE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	877	apply (rule monotone_f)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	878	apply (simp add: Y_subset_A [THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	879	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	880	apply (simp add: lub_upper Y_subset_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	881	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	882
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	883	(first proved 2007-01-25 after relaxing relevance)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	884
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	885	lemma (in Tarski) intY1_subset: "intY1 \<subseteq> A"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	886	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	887	apply (unfold intY1_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	888	apply (rule interval_subset)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	889	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	890	apply (rule Top_in_lattice)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	891	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	892
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	893	lemmas (in Tarski) intY1_elem = intY1_subset [THEN subsetD]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	894
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	895	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	896
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	897	lemma (in Tarski) intY1_f_closed: "x \<in> intY1 \<Longrightarrow> f x \<in> intY1"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	898	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	899	apply (simp add: intY1_def interval_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	900	apply (rule conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	901	apply (rule transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	902	apply (rule lubY_le_flubY)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	903	-- {* @{text "(f (lub Y cl), f x) \<in> r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	904	(sledgehammer [has been proved before now...])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	905	apply (rule_tac f=f in monotoneE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	906	apply (rule monotone_f)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	907	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	908	apply (simp add: intY1_def interval_def intY1_elem)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	909	apply (simp add: intY1_def interval_def)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	910	-- {* @{text "(f x, Top cl) \<in> r"} *}
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	911	apply (rule Top_prop)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	912	apply (rule f_in_funcset [THEN funcset_mem])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	913	apply (simp add: intY1_def interval_def intY1_elem)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	914	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	915
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	916
27368 9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	917	lemma (in Tarski) intY1_func: "(%x: intY1. f x) \<in> intY1 -> intY1"
9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	918	apply (rule restrict_in_funcset)
9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	919	apply (metis intY1_f_closed restrict_in_funcset)
9f90ac19e32b established Plain theory and image haftmann parents: 26806 diff changeset	920	done
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	921
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	922
24855 161eb8381b49 metis method: used theorems paulson parents: 24827 diff changeset	923	lemma (in Tarski) intY1_mono:
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	924	"monotone (%x: intY1. f x) intY1 (induced intY1 r)"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	925	(sledgehammer )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	926	apply (auto simp add: monotone_def induced_def intY1_f_closed)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	927	apply (blast intro: intY1_elem monotone_f [THEN monotoneE])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	928	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	929
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	930	(proof requires relaxing relevance: 2007-01-25)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	931
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	932	lemma (in Tarski) intY1_is_cl:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	933	"(\| pset = intY1, order = induced intY1 r \|) \<in> CompleteLattice"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	934	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	935	apply (unfold intY1_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	936	apply (rule interv_is_compl_latt)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	937	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	938	apply (rule Top_in_lattice)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	939	apply (rule Top_intv_not_empty)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	940	apply (rule lubY_in_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	941	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	942
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	943	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	944
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	945	lemma (in Tarski) v_in_P: "v \<in> P"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	946	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	947	apply (unfold P_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	948	apply (rule_tac A = "intY1" in fixf_subset)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	949	apply (rule intY1_subset)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	950	apply (simp add: CLF.glbH_is_fixp [OF CLF.intro, OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro, OF _ intY1_is_cl, simplified]
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	951	v_def CL_imp_PO intY1_is_cl CLF_set_def intY1_func intY1_mono)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	952	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	953
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	954
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	955	lemma (in Tarski) z_in_interval:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	956	"[\| z \<in> P; \<forall>y\<in>Y. (y, z) \<in> induced P r \|] ==> z \<in> intY1"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	957	(sledgehammer )
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	958	apply (unfold intY1_def P_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	959	apply (rule intervalI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	960	prefer 2
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	961	apply (erule fix_subset [THEN subsetD, THEN Top_prop])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	962	apply (rule lub_least)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	963	apply (rule Y_subset_A)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	964	apply (fast elim!: fix_subset [THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	965	apply (simp add: induced_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	966	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	967
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	968
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	969	lemma (in Tarski) f'z_in_int_rel: "[\| z \<in> P; \<forall>y\<in>Y. (y, z) \<in> induced P r \|]
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	970	==> ((%x: intY1. f x) z, z) \<in> induced intY1 r"
26806 40b411ec05aa Adapted to encoding of sets as predicates berghofe parents: 26483 diff changeset	971	apply (metis P_def acc_def fix_imp_eq fix_subset indI reflE restrict_apply subset_eq z_in_interval)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	972	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	973
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	974	(never proved, 2007-01-22)
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	975
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	976	lemma (in Tarski) tarski_full_lemma:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	977	"\<exists>L. isLub Y (\| pset = P, order = induced P r \|) L"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	978	apply (rule_tac x = "v" in exI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	979	apply (simp add: isLub_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	980	-- {* @{text "v \<in> P"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	981	apply (simp add: v_in_P)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	982	apply (rule conjI)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	983	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	984	-- {* @{text v} is lub *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	985	-- {* @{text "1. \<forall>y:Y. (y, v) \<in> induced P r"} *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	986	apply (rule ballI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	987	apply (simp add: induced_def subsetD v_in_P)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	988	apply (rule conjI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	989	apply (erule Y_ss [THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	990	apply (rule_tac b = "lub Y cl" in transE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	991	apply (rule lub_upper)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	992	apply (rule Y_subset_A, assumption)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	993	apply (rule_tac b = "Top cl" in interval_imp_mem)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	994	apply (simp add: v_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	995	apply (fold intY1_def)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	996	apply (rule CL.glb_in_lattice [OF CL.intro, OF PO.intro CL_axioms.intro, OF _ intY1_is_cl, simplified])
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	997	apply (simp add: CL_imp_PO intY1_is_cl, force)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	998	-- {* @{text v} is LEAST ub *}
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	999	apply clarify
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1000	apply (rule indI)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1001	prefer 3 apply assumption
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1002	prefer 2 apply (simp add: v_in_P)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1003	apply (unfold v_def)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1004	(never proved, 2007-01-22)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	1005	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1006	apply (rule indE)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1007	apply (rule_tac [2] intY1_subset)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1008	(never proved, 2007-01-22)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	1009	(sledgehammer)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	1010	apply (rule CL.glb_lower [OF CL.intro, OF PO.intro CL_axioms.intro, OF _ intY1_is_cl, simplified])
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1011	apply (simp add: CL_imp_PO intY1_is_cl)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1012	apply force
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1013	apply (simp add: induced_def intY1_f_closed z_in_interval)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1014	apply (simp add: P_def fix_imp_eq [of _ f A] reflE
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1015	fix_subset [of f A, THEN subsetD])
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1016	done
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1017
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1018	lemma CompleteLatticeI_simp:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1019	"[\| (\| pset = A, order = r \|) \<in> PartialOrder;
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1020	\<forall>S. S \<subseteq> A --> (\<exists>L. isLub S (\| pset = A, order = r \|) L) \|]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1021	==> (\| pset = A, order = r \|) \<in> CompleteLattice"
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1022	by (simp add: CompleteLatticeI Rdual)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1023
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	1024	(never proved, 2007-01-22)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1025
45705 a25ff4283352 tuning blanchet parents: 43197 diff changeset	1026	declare (in CLF) fixf_po[intro] P_def [simp] A_def [simp] r_def [simp]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	1027	Tarski.tarski_full_lemma [intro] cl_po [intro] cl_co [intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	1028	CompleteLatticeI_simp [intro]
a25ff4283352 tuning blanchet parents: 43197 diff changeset	1029
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1030	theorem (in CLF) Tarski_full:
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1031	"(\| pset = P, order = induced P r\|) \<in> CompleteLattice"
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	1032	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1033	apply (rule CompleteLatticeI_simp)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1034	apply (rule fixf_po, clarify)
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1035	(never proved, 2007-01-22)
43197 c71657bbdbc0 tuned Metis examples blanchet parents: 42762 diff changeset	1036	(sledgehammer)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1037	apply (simp add: P_def A_def r_def)
27681 8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	1038	apply (blast intro!: Tarski.tarski_full_lemma [OF Tarski.intro, OF CLF.intro Tarski_axioms.intro,
8cedebf55539 dropped locale (open) haftmann parents: 27368 diff changeset	1039	OF CL.intro CLF_axioms.intro, OF PO.intro CL_axioms.intro] cl_po cl_co f_cl)
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1040	done
36554 2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	1041
2673979cb54d more neg_clausify proofs that get replaced by direct proofs blanchet parents: 35416 diff changeset	1042	declare (in CLF) fixf_po [rule del] P_def [simp del] A_def [simp del] r_def [simp del]
23449 dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1043	Tarski.tarski_full_lemma [rule del] cl_po [rule del] cl_co [rule del]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1044	CompleteLatticeI_simp [rule del]
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1045
dd874e6a3282 integration of Metis prover paulson parents: diff changeset	1046	end

author	haftmann
	Sun, 19 Feb 2012 15:30:35 +0100
changeset 46553	50a7e97fe653
parent 45970	b6d0cff57d96
child 46752	e9e7209eb375
permissions	-rw-r--r--