isabelle: src/HOL/IMP/Abs_Int2.thy@fd21b4a93043 (annotated)

47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	1	(* Author: Tobias Nipkow *)
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	2
68778 4566bac4517d improved sectioning nipkow parents: 67613 diff changeset	3	subsection "Backward Analysis of Expressions"
4566bac4517d improved sectioning nipkow parents: 67613 diff changeset	4
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	5	theory Abs_Int2
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	6	imports Abs_Int1
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	7	begin
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	8
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	9	instantiation prod :: (order,order) order
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	10	begin
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	11
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	12	definition "less_eq_prod p1 p2 = (fst p1 \<le> fst p2 \<and> snd p1 \<le> snd p2)"
00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	13	definition "less_prod p1 p2 = (p1 \<le> p2 \<and> \<not> p2 \<le> (p1::'a*'b))"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	14
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	15	instance
61179 16775cad1a5c goali -> i nipkow parents: 57492 diff changeset	16	proof (standard, goal_cases)
16775cad1a5c goali -> i nipkow parents: 57492 diff changeset	17	case 1 show ?case by(rule less_prod_def)
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	18	next
61179 16775cad1a5c goali -> i nipkow parents: 57492 diff changeset	19	case 2 show ?case by(simp add: less_eq_prod_def)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	20	next
61179 16775cad1a5c goali -> i nipkow parents: 57492 diff changeset	21	case 3 thus ?case unfolding less_eq_prod_def by(metis order_trans)
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	22	next
61179 16775cad1a5c goali -> i nipkow parents: 57492 diff changeset	23	case 4 thus ?case by(simp add: less_eq_prod_def)(metis eq_iff surjective_pairing)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	24	qed
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	25
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	26	end
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	27
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	28
68778 4566bac4517d improved sectioning nipkow parents: 67613 diff changeset	29	subsubsection "Extended Framework"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	30
51826 054a40461449 canonical names of classes nipkow parents: 51785 diff changeset	31	subclass (in bounded_lattice) semilattice_sup_top ..
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	32
52504 52cd8bebc3b6 tuned names nipkow parents: 51974 diff changeset	33	locale Val_lattice_gamma = Gamma_semilattice where \<gamma> = \<gamma>
51826 054a40461449 canonical names of classes nipkow parents: 51785 diff changeset	34	for \<gamma> :: "'av::bounded_lattice \<Rightarrow> val set" +
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	35	assumes inter_gamma_subset_gamma_inf:
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	36	"\<gamma> a1 \<inter> \<gamma> a2 \<subseteq> \<gamma>(a1 \<sqinter> a2)"
49396 73fb17ed2e08 converted wt into a set, tuned names nipkow parents: 49344 diff changeset	37	and gamma_bot[simp]: "\<gamma> \<bottom> = {}"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	38	begin
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	39
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	40	lemma in_gamma_inf: "x \<in> \<gamma> a1 \<Longrightarrow> x \<in> \<gamma> a2 \<Longrightarrow> x \<in> \<gamma>(a1 \<sqinter> a2)"
69712 dc85b5b3a532 renamings and new material paulson <lp15@cam.ac.uk> parents: 69597 diff changeset	41	by (metis IntI inter_gamma_subset_gamma_inf subsetD)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	42
51848 ed847ce0b70c tuned nipkow parents: 51834 diff changeset	43	lemma gamma_inf: "\<gamma>(a1 \<sqinter> a2) = \<gamma> a1 \<inter> \<gamma> a2"
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	44	by(rule equalityI[OF _ inter_gamma_subset_gamma_inf])
51389 8a9f0503b1c0 factored out Step nipkow parents: 51359 diff changeset	45	(metis inf_le1 inf_le2 le_inf_iff mono_gamma)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	46
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	47	end
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	48
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	49
52504 52cd8bebc3b6 tuned names nipkow parents: 51974 diff changeset	50	locale Val_inv = Val_lattice_gamma where \<gamma> = \<gamma>
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	51	for \<gamma> :: "'av::bounded_lattice \<Rightarrow> val set" +
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	52	fixes test_num' :: "val \<Rightarrow> 'av \<Rightarrow> bool"
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	53	and inv_plus' :: "'av \<Rightarrow> 'av \<Rightarrow> 'av \<Rightarrow> 'av * 'av"
9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	54	and inv_less' :: "bool \<Rightarrow> 'av \<Rightarrow> 'av \<Rightarrow> 'av * 'av"
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	55	assumes test_num': "test_num' i a = (i \<in> \<gamma> a)"
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	56	and inv_plus': "inv_plus' a a1 a2 = (a\<^sub>1',a\<^sub>2') \<Longrightarrow>
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	57	i1 \<in> \<gamma> a1 \<Longrightarrow> i2 \<in> \<gamma> a2 \<Longrightarrow> i1+i2 \<in> \<gamma> a \<Longrightarrow> i1 \<in> \<gamma> a\<^sub>1' \<and> i2 \<in> \<gamma> a\<^sub>2'"
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	58	and inv_less': "inv_less' (i1<i2) a1 a2 = (a\<^sub>1',a\<^sub>2') \<Longrightarrow>
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	59	i1 \<in> \<gamma> a1 \<Longrightarrow> i2 \<in> \<gamma> a2 \<Longrightarrow> i1 \<in> \<gamma> a\<^sub>1' \<and> i2 \<in> \<gamma> a\<^sub>2'"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	60
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	61
52504 52cd8bebc3b6 tuned names nipkow parents: 51974 diff changeset	62	locale Abs_Int_inv = Val_inv where \<gamma> = \<gamma>
51826 054a40461449 canonical names of classes nipkow parents: 51785 diff changeset	63	for \<gamma> :: "'av::bounded_lattice \<Rightarrow> val set"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	64	begin
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	65
51389 8a9f0503b1c0 factored out Step nipkow parents: 51359 diff changeset	66	lemma in_gamma_sup_UpI:
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	67	"s \<in> \<gamma>\<^sub>o S1 \<or> s \<in> \<gamma>\<^sub>o S2 \<Longrightarrow> s \<in> \<gamma>\<^sub>o(S1 \<squnion> S2)"
73932 fd21b4a93043 added opaque_combs and renamed hide_lams to opaque_lifting desharna parents: 69712 diff changeset	68	by (metis (opaque_lifting, no_types) sup_ge1 sup_ge2 mono_gamma_o subsetD)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	69
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	70	fun aval'' :: "aexp \<Rightarrow> 'av st option \<Rightarrow> 'av" where
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	71	"aval'' e None = \<bottom>" \|
51834 8deb369ee70b tuned nipkow parents: 51826 diff changeset	72	"aval'' e (Some S) = aval' e S"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	73
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	74	lemma aval''_correct: "s \<in> \<gamma>\<^sub>o S \<Longrightarrow> aval a s \<in> \<gamma>(aval'' a S)"
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	75	by(cases S)(auto simp add: aval'_correct split: option.splits)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	76
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	77	subsubsection "Backward analysis"
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	78
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	79	fun inv_aval' :: "aexp \<Rightarrow> 'av \<Rightarrow> 'av st option \<Rightarrow> 'av st option" where
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	80	"inv_aval' (N n) a S = (if test_num' n a then S else None)" \|
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	81	"inv_aval' (V x) a S = (case S of None \<Rightarrow> None \| Some S \<Rightarrow>
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	82	let a' = fun S x \<sqinter> a in
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	83	if a' = \<bottom> then None else Some(update S x a'))" \|
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	84	"inv_aval' (Plus e1 e2) a S =
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	85	(let (a1,a2) = inv_plus' a (aval'' e1 S) (aval'' e2 S)
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	86	in inv_aval' e1 a1 (inv_aval' e2 a2 S))"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	87
69597 ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 68778 diff changeset	88	text\<open>The test for \<^const>\<open>bot\<close> in the \<^const>\<open>V\<close>-case is important: \<^const>\<open>bot\<close> indicates that a variable has no possible values, i.e.\ that the current
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	89	program point is unreachable. But then the abstract state should collapse to
69597 ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 68778 diff changeset	90	\<^const>\<open>None\<close>. Put differently, we maintain the invariant that in an abstract
ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 68778 diff changeset	91	state of the form \<^term>\<open>Some s\<close>, all variables are mapped to non-\<^const>\<open>bot\<close> values. Otherwise the (pointwise) sup of two abstract states, one of
ff784d5a5bfb isabelle update -u control_cartouches; wenzelm parents: 68778 diff changeset	92	which contains \<^const>\<open>bot\<close> values, may produce too large a result, thus
67406 23307fd33906 isabelle update_cartouches -c; wenzelm parents: 61179 diff changeset	93	making the analysis less precise.\<close>
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	94
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	95
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	96	fun inv_bval' :: "bexp \<Rightarrow> bool \<Rightarrow> 'av st option \<Rightarrow> 'av st option" where
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	97	"inv_bval' (Bc v) res S = (if v=res then S else None)" \|
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	98	"inv_bval' (Not b) res S = inv_bval' b (\<not> res) S" \|
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	99	"inv_bval' (And b1 b2) res S =
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	100	(if res then inv_bval' b1 True (inv_bval' b2 True S)
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	101	else inv_bval' b1 False S \<squnion> inv_bval' b2 False S)" \|
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	102	"inv_bval' (Less e1 e2) res S =
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	103	(let (a1,a2) = inv_less' res (aval'' e1 S) (aval'' e2 S)
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	104	in inv_aval' e1 a1 (inv_aval' e2 a2 S))"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	105
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	106	lemma inv_aval'_correct: "s \<in> \<gamma>\<^sub>o S \<Longrightarrow> aval e s \<in> \<gamma> a \<Longrightarrow> s \<in> \<gamma>\<^sub>o (inv_aval' e a S)"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	107	proof(induction e arbitrary: a S)
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	108	case N thus ?case by simp (metis test_num')
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	109	next
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	110	case (V x)
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	111	obtain S' where "S = Some S'" and "s \<in> \<gamma>\<^sub>s S'" using \<open>s \<in> \<gamma>\<^sub>o S\<close>
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	112	by(auto simp: in_gamma_option_iff)
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	113	moreover hence "s x \<in> \<gamma> (fun S' x)"
51849 19ee0cebe76d tuned nipkow parents: 51848 diff changeset	114	by(simp add: \<gamma>_st_def)
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	115	moreover have "s x \<in> \<gamma> a" using V(2) by simp
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	116	ultimately show ?case
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	117	by(simp add: Let_def \<gamma>_st_def)
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	118	(metis mono_gamma emptyE in_gamma_inf gamma_bot subset_empty)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	119	next
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	120	case (Plus e1 e2) thus ?case
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	121	using inv_plus'[OF _ aval''_correct aval''_correct]
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	122	by (auto split: prod.split)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	123	qed
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	124
67613 ce654b0e6d69 more symbols; wenzelm parents: 67443 diff changeset	125	lemma inv_bval'_correct: "s \<in> \<gamma>\<^sub>o S \<Longrightarrow> bv = bval b s \<Longrightarrow> s \<in> \<gamma>\<^sub>o(inv_bval' b bv S)"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	126	proof(induction b arbitrary: S bv)
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	127	case Bc thus ?case by simp
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	128	next
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	129	case (Not b) thus ?case by simp
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	130	next
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	131	case (And b1 b2) thus ?case
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	132	by simp (metis And(1) And(2) in_gamma_sup_UpI)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	133	next
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	134	case (Less e1 e2) thus ?case
57492 74bf65a1910a Hypsubst preserves equality hypotheses Thomas Sewell <thomas.sewell@nicta.com.au> parents: 55053 diff changeset	135	apply hypsubst_thin
74bf65a1910a Hypsubst preserves equality hypotheses Thomas Sewell <thomas.sewell@nicta.com.au> parents: 55053 diff changeset	136	apply (auto split: prod.split)
74bf65a1910a Hypsubst preserves equality hypotheses Thomas Sewell <thomas.sewell@nicta.com.au> parents: 55053 diff changeset	137	apply (metis (lifting) inv_aval'_correct aval''_correct inv_less')
74bf65a1910a Hypsubst preserves equality hypotheses Thomas Sewell <thomas.sewell@nicta.com.au> parents: 55053 diff changeset	138	done
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	139	qed
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	140
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	141	definition "step' = Step
51389 8a9f0503b1c0 factored out Step nipkow parents: 51359 diff changeset	142	(\<lambda>x e S. case S of None \<Rightarrow> None \| Some S \<Rightarrow> Some(update S x (aval' e S)))
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	143	(\<lambda>b S. inv_bval' b True S)"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	144
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	145	definition AI :: "com \<Rightarrow> 'av st option acom option" where
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	146	"AI c = pfp (step' \<top>) (bot c)"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	147
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	148	lemma strip_step'[simp]: "strip(step' S c) = strip c"
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	149	by(simp add: step'_def)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	150
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	151	lemma top_on_inv_aval': "\<lbrakk> top_on_opt S X; vars e \<subseteq> -X \<rbrakk> \<Longrightarrow> top_on_opt (inv_aval' e a S) X"
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	152	by(induction e arbitrary: a S) (auto simp: Let_def split: option.splits prod.split)
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	153
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	154	lemma top_on_inv_bval': "\<lbrakk>top_on_opt S X; vars b \<subseteq> -X\<rbrakk> \<Longrightarrow> top_on_opt (inv_bval' b r S) X"
f69530f22f5a tuned names nipkow parents: 53015 diff changeset	155	by(induction b arbitrary: r S) (auto simp: top_on_inv_aval' top_on_sup split: prod.split)
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	156
51785 9685a5b1f7ce more standard order of arguments nipkow parents: 51722 diff changeset	157	lemma top_on_step': "top_on_acom C (- vars C) \<Longrightarrow> top_on_acom (step' \<top> C) (- vars C)"
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	158	unfolding step'_def
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	159	by(rule top_on_Step)
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	160	(auto simp add: top_on_top top_on_inv_bval' split: option.split)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	161
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	162	subsubsection "Correctness"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	163
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	164	lemma step_step': "step (\<gamma>\<^sub>o S) (\<gamma>\<^sub>c C) \<le> \<gamma>\<^sub>c (step' S C)"
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	165	unfolding step_def step'_def
1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	166	by(rule gamma_Step_subcomm)
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	167	(auto simp: intro!: aval'_correct inv_bval'_correct in_gamma_update split: option.splits)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	168
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	169	lemma AI_correct: "AI c = Some C \<Longrightarrow> CS c \<le> \<gamma>\<^sub>c C"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	170	proof(simp add: CS_def AI_def)
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	171	assume 1: "pfp (step' \<top>) (bot c) = Some C"
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	172	have pfp': "step' \<top> C \<le> C" by(rule pfp_pfp[OF 1])
67443 3abf6a722518 standardized towards new-style formal comments: isabelle update_comments; wenzelm parents: 67406 diff changeset	173	have 2: "step (\<gamma>\<^sub>o \<top>) (\<gamma>\<^sub>c C) \<le> \<gamma>\<^sub>c C" \<comment> \<open>transfer the pfp'\<close>
50986 c54ea7f5418f simplified proofs nipkow parents: 49497 diff changeset	174	proof(rule order_trans)
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	175	show "step (\<gamma>\<^sub>o \<top>) (\<gamma>\<^sub>c C) \<le> \<gamma>\<^sub>c (step' \<top> C)" by(rule step_step')
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	176	show "... \<le> \<gamma>\<^sub>c C" by (metis mono_gamma_c[OF pfp'])
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	177	qed
53015 a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	178	have 3: "strip (\<gamma>\<^sub>c C) = c" by(simp add: strip_pfp[OF _ 1] step'_def)
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	179	have "lfp c (step (\<gamma>\<^sub>o \<top>)) \<le> \<gamma>\<^sub>c C"
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	180	by(rule lfp_lowerbound[simplified,where f="step (\<gamma>\<^sub>o \<top>)", OF 3 2])
a1119cf551e8 standardized symbols via "isabelle update_sub_sup", excluding src/Pure and src/Tools/WWW_Find; wenzelm parents: 52504 diff changeset	181	thus "lfp c (step UNIV) \<le> \<gamma>\<^sub>c C" by simp
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	182	qed
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	183
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	184	end
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	185
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	186
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	187	subsubsection "Monotonicity"
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	188
52504 52cd8bebc3b6 tuned names nipkow parents: 51974 diff changeset	189	locale Abs_Int_inv_mono = Abs_Int_inv +
51359 00b45c7e831f major redesign: order instead of preorder, new definition of intervals as quotients nipkow parents: 51037 diff changeset	190	assumes mono_plus': "a1 \<le> b1 \<Longrightarrow> a2 \<le> b2 \<Longrightarrow> plus' a1 a2 \<le> plus' b1 b2"
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	191	and mono_inv_plus': "a1 \<le> b1 \<Longrightarrow> a2 \<le> b2 \<Longrightarrow> r \<le> r' \<Longrightarrow>
9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	192	inv_plus' r a1 a2 \<le> inv_plus' r' b1 b2"
9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	193	and mono_inv_less': "a1 \<le> b1 \<Longrightarrow> a2 \<le> b2 \<Longrightarrow>
9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	194	inv_less' bv a1 a2 \<le> inv_less' bv b1 b2"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	195	begin
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	196
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	197	lemma mono_aval':
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	198	"S1 \<le> S2 \<Longrightarrow> aval' e S1 \<le> aval' e S2"
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	199	by(induction e) (auto simp: mono_plus' mono_fun)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	200
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	201	lemma mono_aval'':
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	202	"S1 \<le> S2 \<Longrightarrow> aval'' e S1 \<le> aval'' e S2"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	203	apply(cases S1)
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	204	apply simp
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	205	apply(cases S2)
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	206	apply simp
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	207	by (simp add: mono_aval')
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	208
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	209	lemma mono_inv_aval': "r1 \<le> r2 \<Longrightarrow> S1 \<le> S2 \<Longrightarrow> inv_aval' e r1 S1 \<le> inv_aval' e r2 S2"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	210	apply(induction e arbitrary: r1 r2 S1 S2)
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	211	apply(auto simp: test_num' Let_def inf_mono split: option.splits prod.splits)
1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	212	apply (metis mono_gamma subsetD)
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	213	apply (metis le_bot inf_mono le_st_iff)
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	214	apply (metis inf_mono mono_update le_st_iff)
51974 9c80e62161a5 tuned names nipkow parents: 51890 diff changeset	215	apply(metis mono_aval'' mono_inv_plus'[simplified less_eq_prod_def] fst_conv snd_conv)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	216	done
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	217
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	218	lemma mono_inv_bval': "S1 \<le> S2 \<Longrightarrow> inv_bval' b bv S1 \<le> inv_bval' b bv S2"
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	219	apply(induction b arbitrary: bv S1 S2)
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	220	apply(simp)
1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	221	apply(simp)
1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	222	apply simp
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	223	apply(metis order_trans[OF _ sup_ge1] order_trans[OF _ sup_ge2])
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	224	apply (simp split: prod.splits)
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	225	apply(metis mono_aval'' mono_inv_aval' mono_inv_less'[simplified less_eq_prod_def] fst_conv snd_conv)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	226	done
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	227
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	228	theorem mono_step': "S1 \<le> S2 \<Longrightarrow> C1 \<le> C2 \<Longrightarrow> step' S1 C1 \<le> step' S2 C2"
51390 1dff81cf425b more factorisation of Step & Co nipkow parents: 51389 diff changeset	229	unfolding step'_def
55053 f69530f22f5a tuned names nipkow parents: 53015 diff changeset	230	by(rule mono2_Step) (auto simp: mono_aval' mono_inv_bval' split: option.split)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	231
51711 df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	232	lemma mono_step'_top: "C1 \<le> C2 \<Longrightarrow> step' \<top> C1 \<le> step' \<top> C2"
df3426139651 complete revision: finally got rid of annoying L-predicate nipkow parents: 51390 diff changeset	233	by (metis mono_step' order_refl)
47613 e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	234
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	235	end
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	236
e72e44cee6f2 added revised version of Abs_Int nipkow parents: diff changeset	237	end

author	desharna
	Thu, 08 Jul 2021 08:42:36 +0200
changeset 73932	fd21b4a93043
parent 69712	dc85b5b3a532
permissions	-rw-r--r--