isabelle: src/HOL/UNITY/Transformers.thy@bcf56a64ce1a (annotated)

13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	1	(* Title: HOL/UNITY/Transformers
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	2	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	3	Copyright 2003 University of Cambridge
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	4
13866 b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	5	Predicate Transformers. From
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	6
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	7	David Meier and Beverly Sanders,
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	8	Composing Leads-to Properties
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	9	Theoretical Computer Science 243:1-2 (2000), 339-361.
13866 b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	10
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	11	David Meier,
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	12	Progress Properties in Program Refinement and Parallel Composition
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	13	Swiss Federal Institute of Technology Zurich (1997)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	14	*)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	15
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	16	header{Predicate Transformers}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	17
16417 9bc16273c2d4 migrated theory headers to new format haftmann parents: 15236 diff changeset	18	theory Transformers imports Comp begin
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	19
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	20	subsection{*Defining the Predicate Transformers @{term wp},
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	21	@{term awp} and @{term wens}*}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	22
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	23	constdefs
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	24	wp :: "[('a*'a) set, 'a set] => 'a set"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	25	--{Dijkstra's weakest-precondition operator (for an individual command)}
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	26	"wp act B == - (act^-1 `` (-B))"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	27
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	28	awp :: "['a program, 'a set] => 'a set"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	29	--{Dijkstra's weakest-precondition operator (for a program)}
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	30	"awp F B == (\<Inter>act \<in> Acts F. wp act B)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	31
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	32	wens :: "['a program, ('a*'a) set, 'a set] => 'a set"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	33	--{The weakest-ensures transformer}
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	34	"wens F act B == gfp(\<lambda>X. (wp act B \<inter> awp F (B \<union> X)) \<union> B)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	35
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	36	text{The fundamental theorem for wp}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	37	theorem wp_iff: "(A <= wp act B) = (act `` A <= B)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	38	by (force simp add: wp_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	39
13874 0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	40	text{This lemma is a good deal more intuitive than the definition!}
0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	41	lemma in_wp_iff: "(a \<in> wp act B) = (\<forall>x. (a,x) \<in> act --> x \<in> B)"
0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	42	by (simp add: wp_def, blast)
0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	43
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	44	lemma Compl_Domain_subset_wp: "- (Domain act) \<subseteq> wp act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	45	by (force simp add: wp_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	46
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	47	lemma wp_empty [simp]: "wp act {} = - (Domain act)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	48	by (force simp add: wp_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	49
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	50	text{The identity relation is the skip action}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	51	lemma wp_Id [simp]: "wp Id B = B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	52	by (simp add: wp_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	53
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	54	lemma wp_totalize_act:
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	55	"wp (totalize_act act) B = (wp act B \<inter> Domain act) \<union> (B - Domain act)"
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	56	by (simp add: wp_def totalize_act_def, blast)
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	57
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	58	lemma awp_subset: "(awp F A \<subseteq> A)"
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	59	by (force simp add: awp_def wp_def)
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	60
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	61	lemma awp_Int_eq: "awp F (A\<inter>B) = awp F A \<inter> awp F B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	62	by (simp add: awp_def wp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	63
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	64	text{The fundamental theorem for awp}
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	65	theorem awp_iff_constrains: "(A <= awp F B) = (F \<in> A co B)"
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	66	by (simp add: awp_def constrains_def wp_iff INT_subset_iff)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	67
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	68	lemma awp_iff_stable: "(A \<subseteq> awp F A) = (F \<in> stable A)"
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	69	by (simp add: awp_iff_constrains stable_def)
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	70
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	71	lemma stable_imp_awp_ident: "F \<in> stable A ==> awp F A = A"
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	72	apply (rule equalityI [OF awp_subset])
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	73	apply (simp add: awp_iff_stable)
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	74	done
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	75
13874 0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	76	lemma wp_mono: "(A \<subseteq> B) ==> wp act A \<subseteq> wp act B"
0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	77	by (simp add: wp_def, blast)
0da2141606c6 More on progress sets paulson parents: 13866 diff changeset	78
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	79	lemma awp_mono: "(A \<subseteq> B) ==> awp F A \<subseteq> awp F B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	80	by (simp add: awp_def wp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	81
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	82	lemma wens_unfold:
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	83	"wens F act B = (wp act B \<inter> awp F (B \<union> wens F act B)) \<union> B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	84	apply (simp add: wens_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	85	apply (rule gfp_unfold)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	86	apply (simp add: mono_def wp_def awp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	87	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	88
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	89	lemma wens_Id [simp]: "wens F Id B = B"
32587 caa5ada96a00 Inter and Union are mere abbreviations for Inf and Sup haftmann parents: 30971 diff changeset	90	by (simp add: wens_def gfp_def wp_def awp_def, blast)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	91
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	92	text{*These two theorems justify the claim that @{term wens} returns the
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	93	weakest assertion satisfying the ensures property*}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	94	lemma ensures_imp_wens: "F \<in> A ensures B ==> \<exists>act \<in> Acts F. A \<subseteq> wens F act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	95	apply (simp add: wens_def ensures_def transient_def, clarify)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	96	apply (rule rev_bexI, assumption)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	97	apply (rule gfp_upperbound)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	98	apply (simp add: constrains_def awp_def wp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	99	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	100
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	101	lemma wens_ensures: "act \<in> Acts F ==> F \<in> (wens F act B) ensures B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	102	by (simp add: wens_def gfp_def constrains_def awp_def wp_def
32587 caa5ada96a00 Inter and Union are mere abbreviations for Inf and Sup haftmann parents: 30971 diff changeset	103	ensures_def transient_def, blast)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	104
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	105	text{These two results constitute assertion (4.13) of the thesis}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	106	lemma wens_mono: "(A \<subseteq> B) ==> wens F act A \<subseteq> wens F act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	107	apply (simp add: wens_def wp_def awp_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	108	apply (rule gfp_mono, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	109	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	110
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	111	lemma wens_weakening: "B \<subseteq> wens F act B"
32587 caa5ada96a00 Inter and Union are mere abbreviations for Inf and Sup haftmann parents: 30971 diff changeset	112	by (simp add: wens_def gfp_def, blast)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	113
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	114	text{Assertion (6), or 4.16 in the thesis}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	115	lemma subset_wens: "A-B \<subseteq> wp act B \<inter> awp F (B \<union> A) ==> A \<subseteq> wens F act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	116	apply (simp add: wens_def wp_def awp_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	117	apply (rule gfp_upperbound, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	118	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	119
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	120	text{Assertion 4.17 in the thesis}
21312 1d39091a3208 started reorgnization of lattice theories nipkow parents: 21026 diff changeset	121	lemma Diff_wens_constrains: "F \<in> (wens F act A - A) co wens F act A"
32587 caa5ada96a00 Inter and Union are mere abbreviations for Inf and Sup haftmann parents: 30971 diff changeset	122	by (simp add: wens_def gfp_def wp_def awp_def constrains_def, blast)
15102 04b0e943fcc9 new simprules Int_subset_iff and Un_subset_iff paulson parents: 13874 diff changeset	123	--{*Proved instantly, yet remarkably fragile. If @{text Un_subset_iff}
04b0e943fcc9 new simprules Int_subset_iff and Un_subset_iff paulson parents: 13874 diff changeset	124	is declared as an iff-rule, then it's almost impossible to prove.
04b0e943fcc9 new simprules Int_subset_iff and Un_subset_iff paulson parents: 13874 diff changeset	125	One proof is via @{text meson} after expanding all definitions, but it's
04b0e943fcc9 new simprules Int_subset_iff and Un_subset_iff paulson parents: 13874 diff changeset	126	slow!*}
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	127
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	128	text{*Assertion (7): 4.18 in the thesis. NOTE that many of these results
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	129	hold for an arbitrary action. We often do not require @{term "act \<in> Acts F"}*}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	130	lemma stable_wens: "F \<in> stable A ==> F \<in> stable (wens F act A)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	131	apply (simp add: stable_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	132	apply (drule constrains_Un [OF Diff_wens_constrains [of F act A]])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	133	apply (simp add: Un_Int_distrib2 Compl_partition2)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	134	apply (erule constrains_weaken, blast)
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	135	apply (simp add: wens_weakening)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	136	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	137
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	138	text{Assertion 4.20 in the thesis.}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	139	lemma wens_Int_eq_lemma:
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	140	"[\|T-B \<subseteq> awp F T; act \<in> Acts F\|]
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	141	==> T \<inter> wens F act B \<subseteq> wens F act (T\<inter>B)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	142	apply (rule subset_wens)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	143	apply (rule_tac P="\<lambda>x. ?f x \<subseteq> ?b" in ssubst [OF wens_unfold])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	144	apply (simp add: wp_def awp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	145	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	146
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	147	text{*Assertion (8): 4.21 in the thesis. Here we indeed require
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	148	@{term "act \<in> Acts F"}*}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	149	lemma wens_Int_eq:
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	150	"[\|T-B \<subseteq> awp F T; act \<in> Acts F\|]
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	151	==> T \<inter> wens F act B = T \<inter> wens F act (T\<inter>B)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	152	apply (rule equalityI)
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	153	apply (simp_all add: Int_lower1)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	154	apply (rule wens_Int_eq_lemma, assumption+)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	155	apply (rule subset_trans [OF _ wens_mono [of "T\<inter>B" B]], auto)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	156	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	157
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	158
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	159	subsection{Defining the Weakest Ensures Set}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	160
23767 7272a839ccd9 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	161	inductive_set
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	162	wens_set :: "['a program, 'a set] => 'a set set"
23767 7272a839ccd9 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	163	for F :: "'a program" and B :: "'a set"
7272a839ccd9 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	164	where
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	165
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	166	Basis: "B \<in> wens_set F B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	167
23767 7272a839ccd9 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	168	\| Wens: "[\|X \<in> wens_set F B; act \<in> Acts F\|] ==> wens F act X \<in> wens_set F B"
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	169
23767 7272a839ccd9 Adapted to new inductive definition package. berghofe parents: 21733 diff changeset	170	\| Union: "W \<noteq> {} ==> \<forall>U \<in> W. U \<in> wens_set F B ==> \<Union>W \<in> wens_set F B"
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	171
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	172	lemma wens_set_imp_co: "A \<in> wens_set F B ==> F \<in> (A-B) co A"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	173	apply (erule wens_set.induct)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	174	apply (simp add: constrains_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	175	apply (drule_tac act1=act and A1=X
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	176	in constrains_Un [OF Diff_wens_constrains])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	177	apply (erule constrains_weaken, blast)
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	178	apply (simp add: wens_weakening)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	179	apply (rule constrains_weaken)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	180	apply (rule_tac I=W and A="\<lambda>v. v-B" and A'="\<lambda>v. v" in constrains_UN, blast+)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	181	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	182
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	183	lemma wens_set_imp_leadsTo: "A \<in> wens_set F B ==> F \<in> A leadsTo B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	184	apply (erule wens_set.induct)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	185	apply (rule leadsTo_refl)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	186	apply (blast intro: wens_ensures leadsTo_Trans)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	187	apply (blast intro: leadsTo_Union)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	188	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	189
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	190	lemma leadsTo_imp_wens_set: "F \<in> A leadsTo B ==> \<exists>C \<in> wens_set F B. A \<subseteq> C"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	191	apply (erule leadsTo_induct_pre)
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	192	apply (blast dest!: ensures_imp_wens intro: wens_set.Basis wens_set.Wens)
0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	193	apply (clarify, drule ensures_weaken_R, assumption)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	194	apply (blast dest!: ensures_imp_wens intro: wens_set.Wens)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	195	apply (case_tac "S={}")
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	196	apply (simp, blast intro: wens_set.Basis)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	197	apply (clarsimp dest!: bchoice simp: ball_conj_distrib Bex_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	198	apply (rule_tac x = "\<Union>{Z. \<exists>U\<in>S. Z = f U}" in exI)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	199	apply (blast intro: wens_set.Union)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	200	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	201
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	202	text{Assertion (9): 4.27 in the thesis.}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	203	lemma leadsTo_iff_wens_set: "(F \<in> A leadsTo B) = (\<exists>C \<in> wens_set F B. A \<subseteq> C)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	204	by (blast intro: leadsTo_imp_wens_set leadsTo_weaken_L wens_set_imp_leadsTo)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	205
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	206	text{*This is the result that requires the definition of @{term wens_set} to
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	207	require @{term W} to be non-empty in the Unio case, for otherwise we should
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	208	always have @{term "{} \<in> wens_set F B"}.*}
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	209	lemma wens_set_imp_subset: "A \<in> wens_set F B ==> B \<subseteq> A"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	210	apply (erule wens_set.induct)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	211	apply (blast intro: wens_weakening [THEN subsetD])+
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	212	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	213
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	214
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	215	subsection{Properties Involving Program Union}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	216
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	217	text{Assertion (4.30) of thesis, reoriented}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	218	lemma awp_Join_eq: "awp (F\<squnion>G) B = awp F B \<inter> awp G B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	219	by (simp add: awp_def wp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	220
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	221	lemma wens_subset: "wens F act B - B \<subseteq> wp act B \<inter> awp F (B \<union> wens F act B)"
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	222	by (subst wens_unfold, fast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	223
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	224	text{Assertion (4.31)}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	225	lemma subset_wens_Join:
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	226	"[\|A = T \<inter> wens F act B; T-B \<subseteq> awp F T; A-B \<subseteq> awp G (A \<union> B)\|]
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	227	==> A \<subseteq> wens (F\<squnion>G) act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	228	apply (subgoal_tac "(T \<inter> wens F act B) - B \<subseteq>
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	229	wp act B \<inter> awp F (B \<union> wens F act B) \<inter> awp F T")
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	230	apply (rule subset_wens)
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	231	apply (simp add: awp_Join_eq awp_Int_eq Un_commute)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	232	apply (simp add: awp_def wp_def, blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	233	apply (insert wens_subset [of F act B], blast)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	234	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	235
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	236	text{Assertion (4.32)}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	237	lemma wens_Join_subset: "wens (F\<squnion>G) act B \<subseteq> wens F act B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	238	apply (simp add: wens_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	239	apply (rule gfp_mono)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	240	apply (auto simp add: awp_Join_eq)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	241	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	242
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	243	text{Lemma, because the inductive step is just too messy.}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	244	lemma wens_Union_inductive_step:
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	245	assumes awpF: "T-B \<subseteq> awp F T"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	246	and awpG: "!!X. X \<in> wens_set F B ==> (T\<inter>X) - B \<subseteq> awp G (T\<inter>X)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	247	shows "[\|X \<in> wens_set F B; act \<in> Acts F; Y \<subseteq> X; T\<inter>X = T\<inter>Y\|]
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	248	==> wens (F\<squnion>G) act Y \<subseteq> wens F act X \<and>
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	249	T \<inter> wens F act X = T \<inter> wens (F\<squnion>G) act Y"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	250	apply (subgoal_tac "wens (F\<squnion>G) act Y \<subseteq> wens F act X")
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	251	prefer 2
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	252	apply (blast dest: wens_mono intro: wens_Join_subset [THEN subsetD], simp)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	253	apply (rule equalityI)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	254	prefer 2 apply blast
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	255	apply (simp add: Int_lower1)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	256	apply (frule wens_set_imp_subset)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	257	apply (subgoal_tac "T-X \<subseteq> awp F T")
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	258	prefer 2 apply (blast intro: awpF [THEN subsetD])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	259	apply (rule_tac B = "wens (F\<squnion>G) act (T\<inter>X)" in subset_trans)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	260	prefer 2 apply (blast intro!: wens_mono)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	261	apply (subst wens_Int_eq, assumption+)
13861 0c18f31d901a Proved the main lemma on progress sets paulson parents: 13853 diff changeset	262	apply (rule subset_wens_Join [of _ T], simp, blast)
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	263	apply (subgoal_tac "T \<inter> wens F act (T\<inter>X) \<union> T\<inter>X = T \<inter> wens F act X")
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	264	prefer 2
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	265	apply (subst wens_Int_eq [symmetric], assumption+)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	266	apply (blast intro: wens_weakening [THEN subsetD], simp)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	267	apply (blast intro: awpG [THEN subsetD] wens_set.Wens)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	268	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	269
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	270	theorem wens_Union:
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	271	assumes awpF: "T-B \<subseteq> awp F T"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	272	and awpG: "!!X. X \<in> wens_set F B ==> (T\<inter>X) - B \<subseteq> awp G (T\<inter>X)"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	273	and major: "X \<in> wens_set F B"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	274	shows "\<exists>Y \<in> wens_set (F\<squnion>G) B. Y \<subseteq> X & T\<inter>X = T\<inter>Y"
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	275	apply (rule wens_set.induct [OF major])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	276	txt{Basis: trivial}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	277	apply (blast intro: wens_set.Basis)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	278	txt{Inductive step}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	279	apply clarify
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	280	apply (rule_tac x = "wens (F\<squnion>G) act Y" in rev_bexI)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	281	apply (force intro: wens_set.Wens)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	282	apply (simp add: wens_Union_inductive_step [OF awpF awpG])
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	283	txt{Union: by Axiom of Choice}
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	284	apply (simp add: ball_conj_distrib Bex_def)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	285	apply (clarify dest!: bchoice)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	286	apply (rule_tac x = "\<Union>{Z. \<exists>U\<in>W. Z = f U}" in exI)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	287	apply (blast intro: wens_set.Union)
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	288	done
0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	289
13866 b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	290	theorem leadsTo_Join:
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	291	assumes leadsTo: "F \<in> A leadsTo B"
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	292	and awpF: "T-B \<subseteq> awp F T"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	293	and awpG: "!!X. X \<in> wens_set F B ==> (T\<inter>X) - B \<subseteq> awp G (T\<inter>X)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	294	shows "F\<squnion>G \<in> T\<inter>A leadsTo B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	295	apply (rule leadsTo [THEN leadsTo_imp_wens_set, THEN bexE])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	296	apply (rule wens_Union [THEN bexE])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	297	apply (rule awpF)
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	298	apply (erule awpG, assumption)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	299	apply (blast intro: wens_set_imp_leadsTo [THEN leadsTo_weaken_L])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	300	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	301
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	302
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	303	subsection {The Set @{term "wens_set F B"} for a Single-Assignment Program}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	304	text{Thesis Section 4.3.3}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	305
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	306	text{We start by proving laws about single-assignment programs}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	307	lemma awp_single_eq [simp]:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	308	"awp (mk_program (init, {act}, allowed)) B = B \<inter> wp act B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	309	by (force simp add: awp_def wp_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	310
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	311	lemma wp_Un_subset: "wp act A \<union> wp act B \<subseteq> wp act (A \<union> B)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	312	by (force simp add: wp_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	313
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	314	lemma wp_Un_eq: "single_valued act ==> wp act (A \<union> B) = wp act A \<union> wp act B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	315	apply (rule equalityI)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	316	apply (force simp add: wp_def single_valued_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	317	apply (rule wp_Un_subset)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	318	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	319
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	320	lemma wp_UN_subset: "(\<Union>i\<in>I. wp act (A i)) \<subseteq> wp act (\<Union>i\<in>I. A i)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	321	by (force simp add: wp_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	322
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	323	lemma wp_UN_eq:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	324	"[\|single_valued act; I\<noteq>{}\|]
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	325	==> wp act (\<Union>i\<in>I. A i) = (\<Union>i\<in>I. wp act (A i))"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	326	apply (rule equalityI)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	327	prefer 2 apply (rule wp_UN_subset)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	328	apply (simp add: wp_def Image_INT_eq)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	329	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	330
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	331	lemma wens_single_eq:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	332	"wens (mk_program (init, {act}, allowed)) act B = B \<union> wp act B"
32587 caa5ada96a00 Inter and Union are mere abbreviations for Inf and Sup haftmann parents: 30971 diff changeset	333	by (simp add: wens_def gfp_def wp_def, blast)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	334
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	335
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	336	text{Next, we express the @{term "wens_set"} for single-assignment programs}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	337
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	338	constdefs
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	339	wens_single_finite :: "[('a*'a) set, 'a set, nat] => 'a set"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30952 diff changeset	340	"wens_single_finite act B k == \<Union>i \<in> atMost k. (wp act ^^ i) B"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	341
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	342	wens_single :: "[('a*'a) set, 'a set] => 'a set"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30952 diff changeset	343	"wens_single act B == \<Union>i. (wp act ^^ i) B"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	344
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	345	lemma wens_single_Un_eq:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	346	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	347	==> wens_single act B \<union> wp act (wens_single act B) = wens_single act B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	348	apply (rule equalityI)
32693 6c6b1ba5e71e tuned proofs haftmann parents: 32587 diff changeset	349	apply (simp_all add: Un_upper1)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	350	apply (simp add: wens_single_def wp_UN_eq, clarify)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	351	apply (rule_tac a="Suc(i)" in UN_I, auto)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	352	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	353
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	354	lemma atMost_nat_nonempty: "atMost (k::nat) \<noteq> {}"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	355	by force
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	356
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	357	lemma wens_single_finite_0 [simp]: "wens_single_finite act B 0 = B"
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	358	by (simp add: wens_single_finite_def)
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	359
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	360	lemma wens_single_finite_Suc:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	361	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	362	==> wens_single_finite act B (Suc k) =
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	363	wens_single_finite act B k \<union> wp act (wens_single_finite act B k)"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	364	apply (simp add: wens_single_finite_def image_def
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	365	wp_UN_eq [OF _ atMost_nat_nonempty])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	366	apply (force elim!: le_SucE)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	367	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	368
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	369	lemma wens_single_finite_Suc_eq_wens:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	370	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	371	==> wens_single_finite act B (Suc k) =
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	372	wens (mk_program (init, {act}, allowed)) act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	373	(wens_single_finite act B k)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	374	by (simp add: wens_single_finite_Suc wens_single_eq)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	375
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	376	lemma def_wens_single_finite_Suc_eq_wens:
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	377	"[\|F = mk_program (init, {act}, allowed); single_valued act\|]
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	378	==> wens_single_finite act B (Suc k) =
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	379	wens F act (wens_single_finite act B k)"
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	380	by (simp add: wens_single_finite_Suc_eq_wens)
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	381
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	382	lemma wens_single_finite_Un_eq:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	383	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	384	==> wens_single_finite act B k \<union> wp act (wens_single_finite act B k)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	385	\<in> range (wens_single_finite act B)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	386	by (simp add: wens_single_finite_Suc [symmetric])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	387
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	388	lemma wens_single_eq_Union:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	389	"wens_single act B = \<Union>range (wens_single_finite act B)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	390	by (simp add: wens_single_finite_def wens_single_def, blast)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	391
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	392	lemma wens_single_finite_eq_Union:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	393	"wens_single_finite act B n = (\<Union>k\<in>atMost n. wens_single_finite act B k)"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	394	apply (auto simp add: wens_single_finite_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	395	apply (blast intro: le_trans)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	396	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	397
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	398	lemma wens_single_finite_mono:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	399	"m \<le> n ==> wens_single_finite act B m \<subseteq> wens_single_finite act B n"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	400	by (force simp add: wens_single_finite_eq_Union [of act B n])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	401
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	402	lemma wens_single_finite_subset_wens_single:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	403	"wens_single_finite act B k \<subseteq> wens_single act B"
15236 f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	404	by (simp add: wens_single_eq_Union, blast)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	405
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	406	lemma subset_wens_single_finite:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	407	"[\|W \<subseteq> wens_single_finite act B ` (atMost k); single_valued act; W\<noteq>{}\|]
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	408	==> \<exists>m. \<Union>W = wens_single_finite act B m"
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	409	apply (induct k)
15236 f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	410	apply (rule_tac x=0 in exI, simp, blast)
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	411	apply (auto simp add: atMost_Suc)
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	412	apply (case_tac "wens_single_finite act B (Suc k) \<in> W")
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	413	prefer 2 apply blast
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	414	apply (drule_tac x="Suc k" in spec)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	415	apply (erule notE, rule equalityI)
15236 f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	416	prefer 2 apply blast
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	417	apply (subst wens_single_finite_eq_Union)
f289e8ba2bb3 Proofs needed to be updated because induction now preserves name of nipkow parents: 15102 diff changeset	418	apply (simp add: atMost_Suc, blast)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	419	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	420
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	421	text{lemma for Union case}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	422	lemma Union_eq_wens_single:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	423	"\<lbrakk>\<forall>k. \<not> W \<subseteq> wens_single_finite act B ` {..k};
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	424	W \<subseteq> insert (wens_single act B)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	425	(range (wens_single_finite act B))\<rbrakk>
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	426	\<Longrightarrow> \<Union>W = wens_single act B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	427	apply (case_tac "wens_single act B \<in> W")
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	428	apply (blast dest: wens_single_finite_subset_wens_single [THEN subsetD])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	429	apply (simp add: wens_single_eq_Union)
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	430	apply (rule equalityI, blast)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	431	apply (simp add: UN_subset_iff, clarify)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	432	apply (subgoal_tac "\<exists>y\<in>W. \<exists>n. y = wens_single_finite act B n & i\<le>n")
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	433	apply (blast intro: wens_single_finite_mono [THEN subsetD])
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	434	apply (drule_tac x=i in spec)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	435	apply (force simp add: atMost_def)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	436	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	437
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	438	lemma wens_set_subset_single:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	439	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	440	==> wens_set (mk_program (init, {act}, allowed)) B \<subseteq>
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	441	insert (wens_single act B) (range (wens_single_finite act B))"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	442	apply (rule subsetI)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	443	apply (erule wens_set.induct)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	444	txt{Basis}
21733 131dd2a27137 Modified lattice locale nipkow parents: 21312 diff changeset	445	apply (fastsimp simp add: wens_single_finite_def)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	446	txt{Wens inductive step}
21733 131dd2a27137 Modified lattice locale nipkow parents: 21312 diff changeset	447	apply (case_tac "acta = Id", simp)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	448	apply (simp add: wens_single_eq)
21733 131dd2a27137 Modified lattice locale nipkow parents: 21312 diff changeset	449	apply (elim disjE)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	450	apply (simp add: wens_single_Un_eq)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	451	apply (force simp add: wens_single_finite_Un_eq)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	452	txt{Union inductive step}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	453	apply (case_tac "\<exists>k. W \<subseteq> wens_single_finite act B ` (atMost k)")
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	454	apply (blast dest!: subset_wens_single_finite, simp)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	455	apply (rule disjI1 [OF Union_eq_wens_single], blast+)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	456	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	457
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	458	lemma wens_single_finite_in_wens_set:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	459	"single_valued act \<Longrightarrow>
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	460	wens_single_finite act B k
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	461	\<in> wens_set (mk_program (init, {act}, allowed)) B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	462	apply (induct_tac k)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	463	apply (simp add: wens_single_finite_def wens_set.Basis)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	464	apply (simp add: wens_set.Wens
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	465	wens_single_finite_Suc_eq_wens [of act B _ init allowed])
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	466	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	467
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	468	lemma single_subset_wens_set:
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	469	"single_valued act
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	470	==> insert (wens_single act B) (range (wens_single_finite act B)) \<subseteq>
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	471	wens_set (mk_program (init, {act}, allowed)) B"
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	472	apply (simp add: wens_single_eq_Union UN_eq)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	473	apply (blast intro: wens_set.Union wens_single_finite_in_wens_set)
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	474	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	475
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	476	text{Theorem (4.29)}
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	477	theorem wens_set_single_eq:
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	478	"[\|F = mk_program (init, {act}, allowed); single_valued act\|]
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	479	==> wens_set F B =
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	480	insert (wens_single act B) (range (wens_single_finite act B))"
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	481	apply (rule equalityI)
13851 f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	482	apply (simp add: wens_set_subset_single)
f6923453953a new UNITY examples theory paulson parents: 13832 diff changeset	483	apply (erule ssubst, erule single_subset_wens_set)
13832 e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	484	done
e7649436869c completed proofs for programs consisting of a single assignment paulson parents: 13821 diff changeset	485
13853 89131afa9f01 New theory ProgressSets. Definition of closure sets paulson parents: 13851 diff changeset	486	text{Generalizing Misra's Fixed Point Union Theorem (4.41)}
89131afa9f01 New theory ProgressSets. Definition of closure sets paulson parents: 13851 diff changeset	487
13866 b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	488	lemma fp_leadsTo_Join:
13853 89131afa9f01 New theory ProgressSets. Definition of closure sets paulson parents: 13851 diff changeset	489	"[\|T-B \<subseteq> awp F T; T-B \<subseteq> FP G; F \<in> A leadsTo B\|] ==> F\<squnion>G \<in> T\<inter>A leadsTo B"
13866 b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	490	apply (rule leadsTo_Join, assumption, blast)
b42d7983a822 More "progress set" material paulson parents: 13861 diff changeset	491	apply (simp add: FP_def awp_iff_constrains stable_def constrains_def, blast)
13853 89131afa9f01 New theory ProgressSets. Definition of closure sets paulson parents: 13851 diff changeset	492	done
89131afa9f01 New theory ProgressSets. Definition of closure sets paulson parents: 13851 diff changeset	493
13821 0fd39aa77095 new theory Transformers: Meier-Sanders non-interference theory paulson parents: diff changeset	494	end

author	nipkow
	Tue, 20 Oct 2009 14:44:02 +0200
changeset 33019	bcf56a64ce1a
parent 32693	6c6b1ba5e71e
child 35416	d8d7d1b785af
permissions	-rw-r--r--