isabelle: src/HOL/MicroJava/BV/Effect.thy@721b622d8967 (annotated)

12516 d09d0f160888 exceptions kleing parents: diff changeset	1	(* Title: HOL/MicroJava/BV/Effect.thy
d09d0f160888 exceptions kleing parents: diff changeset	2	ID: $Id$
d09d0f160888 exceptions kleing parents: diff changeset	3	Author: Gerwin Klein
d09d0f160888 exceptions kleing parents: diff changeset	4	Copyright 2000 Technische Universitaet Muenchen
d09d0f160888 exceptions kleing parents: diff changeset	5	*)
d09d0f160888 exceptions kleing parents: diff changeset	6
d09d0f160888 exceptions kleing parents: diff changeset	7	header {* Effect of Instructions on the State Type *}
d09d0f160888 exceptions kleing parents: diff changeset	8
d09d0f160888 exceptions kleing parents: diff changeset	9	theory Effect = JVMType + JVMExec:
d09d0f160888 exceptions kleing parents: diff changeset	10
d09d0f160888 exceptions kleing parents: diff changeset	11	types
d09d0f160888 exceptions kleing parents: diff changeset	12	succ_type = "(p_count \<times> state_type option) list"
d09d0f160888 exceptions kleing parents: diff changeset	13
d09d0f160888 exceptions kleing parents: diff changeset	14	text {* Program counter of successor instructions: *}
d09d0f160888 exceptions kleing parents: diff changeset	15	consts
d09d0f160888 exceptions kleing parents: diff changeset	16	succs :: "instr => p_count => p_count list"
d09d0f160888 exceptions kleing parents: diff changeset	17	primrec
d09d0f160888 exceptions kleing parents: diff changeset	18	"succs (Load idx) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	19	"succs (Store idx) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	20	"succs (LitPush v) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	21	"succs (Getfield F C) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	22	"succs (Putfield F C) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	23	"succs (New C) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	24	"succs (Checkcast C) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	25	"succs Pop pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	26	"succs Dup pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	27	"succs Dup_x1 pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	28	"succs Dup_x2 pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	29	"succs Swap pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	30	"succs IAdd pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	31	"succs (Ifcmpeq b) pc = [pc+1, nat (int pc + b)]"
d09d0f160888 exceptions kleing parents: diff changeset	32	"succs (Goto b) pc = [nat (int pc + b)]"
d09d0f160888 exceptions kleing parents: diff changeset	33	"succs Return pc = [pc]"
d09d0f160888 exceptions kleing parents: diff changeset	34	"succs (Invoke C mn fpTs) pc = [pc+1]"
d09d0f160888 exceptions kleing parents: diff changeset	35	"succs Throw pc = [pc]"
d09d0f160888 exceptions kleing parents: diff changeset	36
d09d0f160888 exceptions kleing parents: diff changeset	37	text "Effect of instruction on the state type:"
d09d0f160888 exceptions kleing parents: diff changeset	38	consts
d09d0f160888 exceptions kleing parents: diff changeset	39	eff' :: "instr \<times> jvm_prog \<times> state_type => state_type"
d09d0f160888 exceptions kleing parents: diff changeset	40
d09d0f160888 exceptions kleing parents: diff changeset	41	recdef eff' "{}"
d09d0f160888 exceptions kleing parents: diff changeset	42	"eff' (Load idx, G, (ST, LT)) = (ok_val (LT ! idx) # ST, LT)"
d09d0f160888 exceptions kleing parents: diff changeset	43	"eff' (Store idx, G, (ts#ST, LT)) = (ST, LT[idx:= OK ts])"
d09d0f160888 exceptions kleing parents: diff changeset	44	"eff' (LitPush v, G, (ST, LT)) = (the (typeof (\<lambda>v. None) v) # ST, LT)"
d09d0f160888 exceptions kleing parents: diff changeset	45	"eff' (Getfield F C, G, (oT#ST, LT)) = (snd (the (field (G,C) F)) # ST, LT)"
d09d0f160888 exceptions kleing parents: diff changeset	46	"eff' (Putfield F C, G, (vT#oT#ST, LT)) = (ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	47	"eff' (New C, G, (ST,LT)) = (Class C # ST, LT)"
d09d0f160888 exceptions kleing parents: diff changeset	48	"eff' (Checkcast C, G, (RefT rt#ST,LT)) = (Class C # ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	49	"eff' (Pop, G, (ts#ST,LT)) = (ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	50	"eff' (Dup, G, (ts#ST,LT)) = (ts#ts#ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	51	"eff' (Dup_x1, G, (ts1#ts2#ST,LT)) = (ts1#ts2#ts1#ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	52	"eff' (Dup_x2, G, (ts1#ts2#ts3#ST,LT)) = (ts1#ts2#ts3#ts1#ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	53	"eff' (Swap, G, (ts1#ts2#ST,LT)) = (ts2#ts1#ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	54	"eff' (IAdd, G, (PrimT Integer#PrimT Integer#ST,LT))
d09d0f160888 exceptions kleing parents: diff changeset	55	= (PrimT Integer#ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	56	"eff' (Ifcmpeq b, G, (ts1#ts2#ST,LT)) = (ST,LT)"
d09d0f160888 exceptions kleing parents: diff changeset	57	"eff' (Goto b, G, s) = s"
d09d0f160888 exceptions kleing parents: diff changeset	58	-- "Return has no successor instruction in the same method"
d09d0f160888 exceptions kleing parents: diff changeset	59	"eff' (Return, G, s) = s"
d09d0f160888 exceptions kleing parents: diff changeset	60	-- "Throw always terminates abruptly"
d09d0f160888 exceptions kleing parents: diff changeset	61	"eff' (Throw, G, s) = s"
d09d0f160888 exceptions kleing parents: diff changeset	62	"eff' (Invoke C mn fpTs, G, (ST,LT)) = (let ST' = drop (length fpTs) ST
d09d0f160888 exceptions kleing parents: diff changeset	63	in (fst (snd (the (method (G,C) (mn,fpTs))))#(tl ST'),LT))"
d09d0f160888 exceptions kleing parents: diff changeset	64
d09d0f160888 exceptions kleing parents: diff changeset	65
d09d0f160888 exceptions kleing parents: diff changeset	66	consts
d09d0f160888 exceptions kleing parents: diff changeset	67	match_any :: "jvm_prog \<Rightarrow> p_count \<Rightarrow> exception_table \<Rightarrow> cname list"
d09d0f160888 exceptions kleing parents: diff changeset	68	primrec
d09d0f160888 exceptions kleing parents: diff changeset	69	"match_any G pc [] = []"
d09d0f160888 exceptions kleing parents: diff changeset	70	"match_any G pc (e#es) = (let (start_pc, end_pc, handler_pc, catch_type) = e;
d09d0f160888 exceptions kleing parents: diff changeset	71	es' = match_any G pc es
d09d0f160888 exceptions kleing parents: diff changeset	72	in
d09d0f160888 exceptions kleing parents: diff changeset	73	if start_pc <= pc \<and> pc < end_pc then catch_type#es' else es')"
d09d0f160888 exceptions kleing parents: diff changeset	74
d09d0f160888 exceptions kleing parents: diff changeset	75
d09d0f160888 exceptions kleing parents: diff changeset	76	consts
d09d0f160888 exceptions kleing parents: diff changeset	77	xcpt_names :: "instr \<times> jvm_prog \<times> p_count \<times> exception_table => cname list"
d09d0f160888 exceptions kleing parents: diff changeset	78	recdef xcpt_names "{}"
d09d0f160888 exceptions kleing parents: diff changeset	79	"xcpt_names (Getfield F C, G, pc, et) = [Xcpt NullPointer]"
d09d0f160888 exceptions kleing parents: diff changeset	80	"xcpt_names (Putfield F C, G, pc, et) = [Xcpt NullPointer]"
d09d0f160888 exceptions kleing parents: diff changeset	81	"xcpt_names (New C, G, pc, et) = [Xcpt OutOfMemory]"
d09d0f160888 exceptions kleing parents: diff changeset	82	"xcpt_names (Checkcast C, G, pc, et) = [Xcpt ClassCast]"
d09d0f160888 exceptions kleing parents: diff changeset	83	"xcpt_names (Throw, G, pc, et) = match_any G pc et"
d09d0f160888 exceptions kleing parents: diff changeset	84	"xcpt_names (Invoke C m p, G, pc, et) = match_any G pc et"
d09d0f160888 exceptions kleing parents: diff changeset	85	"xcpt_names (i, G, pc, et) = []"
d09d0f160888 exceptions kleing parents: diff changeset	86
d09d0f160888 exceptions kleing parents: diff changeset	87
d09d0f160888 exceptions kleing parents: diff changeset	88	constdefs
d09d0f160888 exceptions kleing parents: diff changeset	89	xcpt_eff :: "instr \<Rightarrow> jvm_prog \<Rightarrow> p_count \<Rightarrow> state_type option \<Rightarrow> exception_table \<Rightarrow> succ_type"
d09d0f160888 exceptions kleing parents: diff changeset	90	"xcpt_eff i G pc s et ==
d09d0f160888 exceptions kleing parents: diff changeset	91	map (\<lambda>C. (the (match_exception_table G C pc et), case s of None \<Rightarrow> None \| Some s' \<Rightarrow> Some ([Class C], snd s')))
d09d0f160888 exceptions kleing parents: diff changeset	92	(xcpt_names (i,G,pc,et))"
d09d0f160888 exceptions kleing parents: diff changeset	93
d09d0f160888 exceptions kleing parents: diff changeset	94	norm_eff :: "instr \<Rightarrow> jvm_prog \<Rightarrow> state_type option \<Rightarrow> state_type option"
d09d0f160888 exceptions kleing parents: diff changeset	95	"norm_eff i G == option_map (\<lambda>s. eff' (i,G,s))"
d09d0f160888 exceptions kleing parents: diff changeset	96
d09d0f160888 exceptions kleing parents: diff changeset	97	eff :: "instr => jvm_prog => p_count => exception_table => state_type option => succ_type"
d09d0f160888 exceptions kleing parents: diff changeset	98	"eff i G pc et s == (map (\<lambda>pc'. (pc',norm_eff i G s)) (succs i pc)) @ (xcpt_eff i G pc s et)"
d09d0f160888 exceptions kleing parents: diff changeset	99
d09d0f160888 exceptions kleing parents: diff changeset	100
d09d0f160888 exceptions kleing parents: diff changeset	101	text "Conditions under which eff is applicable:"
d09d0f160888 exceptions kleing parents: diff changeset	102	consts
d09d0f160888 exceptions kleing parents: diff changeset	103	app' :: "instr \<times> jvm_prog \<times> nat \<times> ty \<times> state_type => bool"
d09d0f160888 exceptions kleing parents: diff changeset	104
d09d0f160888 exceptions kleing parents: diff changeset	105	recdef app' "{}"
d09d0f160888 exceptions kleing parents: diff changeset	106	"app' (Load idx, G, maxs, rT, s) = (idx < length (snd s) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	107	(snd s) ! idx \<noteq> Err \<and>
d09d0f160888 exceptions kleing parents: diff changeset	108	length (fst s) < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	109	"app' (Store idx, G, maxs, rT, (ts#ST, LT)) = (idx < length LT)"
d09d0f160888 exceptions kleing parents: diff changeset	110	"app' (LitPush v, G, maxs, rT, s) = (length (fst s) < maxs \<and> typeof (\<lambda>t. None) v \<noteq> None)"
d09d0f160888 exceptions kleing parents: diff changeset	111	"app' (Getfield F C, G, maxs, rT, (oT#ST, LT)) = (is_class G C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	112	field (G,C) F \<noteq> None \<and>
d09d0f160888 exceptions kleing parents: diff changeset	113	fst (the (field (G,C) F)) = C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	114	G \<turnstile> oT \<preceq> (Class C))"
d09d0f160888 exceptions kleing parents: diff changeset	115	"app' (Putfield F C, G, maxs, rT, (vT#oT#ST, LT)) = (is_class G C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	116	field (G,C) F \<noteq> None \<and>
d09d0f160888 exceptions kleing parents: diff changeset	117	fst (the (field (G,C) F)) = C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	118	G \<turnstile> oT \<preceq> (Class C) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	119	G \<turnstile> vT \<preceq> (snd (the (field (G,C) F))))"
d09d0f160888 exceptions kleing parents: diff changeset	120	"app' (New C, G, maxs, rT, s) = (is_class G C \<and> length (fst s) < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	121	"app' (Checkcast C, G, maxs, rT, (RefT rt#ST,LT)) = (is_class G C)"
d09d0f160888 exceptions kleing parents: diff changeset	122	"app' (Pop, G, maxs, rT, (ts#ST,LT)) = True"
d09d0f160888 exceptions kleing parents: diff changeset	123	"app' (Dup, G, maxs, rT, (ts#ST,LT)) = (1+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	124	"app' (Dup_x1, G, maxs, rT, (ts1#ts2#ST,LT)) = (2+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	125	"app' (Dup_x2, G, maxs, rT, (ts1#ts2#ts3#ST,LT)) = (3+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	126	"app' (Swap, G, maxs, rT, (ts1#ts2#ST,LT)) = True"
d09d0f160888 exceptions kleing parents: diff changeset	127	"app' (IAdd, G, maxs, rT, (PrimT Integer#PrimT Integer#ST,LT))
d09d0f160888 exceptions kleing parents: diff changeset	128	= True"
d09d0f160888 exceptions kleing parents: diff changeset	129	"app' (Ifcmpeq b, G, maxs, rT, (ts#ts'#ST,LT)) = ((\<exists>p. ts = PrimT p \<and> ts' = PrimT p) \<or>
d09d0f160888 exceptions kleing parents: diff changeset	130	(\<exists>r r'. ts = RefT r \<and> ts' = RefT r'))"
d09d0f160888 exceptions kleing parents: diff changeset	131	"app' (Goto b, G, maxs, rT, s) = True"
d09d0f160888 exceptions kleing parents: diff changeset	132	"app' (Return, G, maxs, rT, (T#ST,LT)) = (G \<turnstile> T \<preceq> rT)"
d09d0f160888 exceptions kleing parents: diff changeset	133	"app' (Throw, G, maxs, rT, (T#ST,LT)) = (\<exists>r. T = RefT r)"
d09d0f160888 exceptions kleing parents: diff changeset	134	"app' (Invoke C mn fpTs, G, maxs, rT, s) =
d09d0f160888 exceptions kleing parents: diff changeset	135	(length fpTs < length (fst s) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	136	(let apTs = rev (take (length fpTs) (fst s));
d09d0f160888 exceptions kleing parents: diff changeset	137	X = hd (drop (length fpTs) (fst s))
d09d0f160888 exceptions kleing parents: diff changeset	138	in
d09d0f160888 exceptions kleing parents: diff changeset	139	G \<turnstile> X \<preceq> Class C \<and> is_class G C \<and> method (G,C) (mn,fpTs) \<noteq> None \<and>
d09d0f160888 exceptions kleing parents: diff changeset	140	(\<forall>(aT,fT)\<in>set(zip apTs fpTs). G \<turnstile> aT \<preceq> fT)))"
d09d0f160888 exceptions kleing parents: diff changeset	141
d09d0f160888 exceptions kleing parents: diff changeset	142	"app' (i,G,maxs,rT,s) = False"
d09d0f160888 exceptions kleing parents: diff changeset	143
d09d0f160888 exceptions kleing parents: diff changeset	144
d09d0f160888 exceptions kleing parents: diff changeset	145
d09d0f160888 exceptions kleing parents: diff changeset	146	constdefs
d09d0f160888 exceptions kleing parents: diff changeset	147	xcpt_app :: "instr \<Rightarrow> jvm_prog \<Rightarrow> nat \<Rightarrow> exception_table \<Rightarrow> bool"
d09d0f160888 exceptions kleing parents: diff changeset	148	"xcpt_app i G pc et \<equiv> \<forall>C\<in>set(xcpt_names (i,G,pc,et)). is_class G C"
d09d0f160888 exceptions kleing parents: diff changeset	149
d09d0f160888 exceptions kleing parents: diff changeset	150	app :: "instr => jvm_prog => nat => ty => nat => exception_table => state_type option => bool"
d09d0f160888 exceptions kleing parents: diff changeset	151	"app i G maxs rT pc et s == case s of None => True \| Some t => app' (i,G,maxs,rT,t) \<and> xcpt_app i G pc et"
d09d0f160888 exceptions kleing parents: diff changeset	152
d09d0f160888 exceptions kleing parents: diff changeset	153
d09d0f160888 exceptions kleing parents: diff changeset	154	lemma 1: "2 < length a ==> (\<exists>l l' l'' ls. a = l#l'#l''#ls)"
d09d0f160888 exceptions kleing parents: diff changeset	155	proof (cases a)
d09d0f160888 exceptions kleing parents: diff changeset	156	fix x xs assume "a = x#xs" "2 < length a"
d09d0f160888 exceptions kleing parents: diff changeset	157	thus ?thesis by - (cases xs, simp, cases "tl xs", auto)
d09d0f160888 exceptions kleing parents: diff changeset	158	qed auto
d09d0f160888 exceptions kleing parents: diff changeset	159
d09d0f160888 exceptions kleing parents: diff changeset	160	lemma 2: "\<not>(2 < length a) ==> a = [] \<or> (\<exists> l. a = [l]) \<or> (\<exists> l l'. a = [l,l'])"
d09d0f160888 exceptions kleing parents: diff changeset	161	proof -;
d09d0f160888 exceptions kleing parents: diff changeset	162	assume "\<not>(2 < length a)"
d09d0f160888 exceptions kleing parents: diff changeset	163	hence "length a < (Suc (Suc (Suc 0)))" by simp
d09d0f160888 exceptions kleing parents: diff changeset	164	hence * : "length a = 0 \<or> length a = Suc 0 \<or> length a = Suc (Suc 0)"
d09d0f160888 exceptions kleing parents: diff changeset	165	by (auto simp add: less_Suc_eq)
d09d0f160888 exceptions kleing parents: diff changeset	166
d09d0f160888 exceptions kleing parents: diff changeset	167	{
d09d0f160888 exceptions kleing parents: diff changeset	168	fix x
d09d0f160888 exceptions kleing parents: diff changeset	169	assume "length x = Suc 0"
d09d0f160888 exceptions kleing parents: diff changeset	170	hence "\<exists> l. x = [l]" by - (cases x, auto)
d09d0f160888 exceptions kleing parents: diff changeset	171	} note 0 = this
d09d0f160888 exceptions kleing parents: diff changeset	172
d09d0f160888 exceptions kleing parents: diff changeset	173	have "length a = Suc (Suc 0) ==> \<exists>l l'. a = [l,l']" by (cases a, auto dest: 0)
d09d0f160888 exceptions kleing parents: diff changeset	174	with * show ?thesis by (auto dest: 0)
d09d0f160888 exceptions kleing parents: diff changeset	175	qed
d09d0f160888 exceptions kleing parents: diff changeset	176
d09d0f160888 exceptions kleing parents: diff changeset	177	lemmas [simp] = app_def xcpt_app_def
d09d0f160888 exceptions kleing parents: diff changeset	178
d09d0f160888 exceptions kleing parents: diff changeset	179	text {*
d09d0f160888 exceptions kleing parents: diff changeset	180	\medskip
d09d0f160888 exceptions kleing parents: diff changeset	181	simp rules for @{term app}
d09d0f160888 exceptions kleing parents: diff changeset	182	*}
d09d0f160888 exceptions kleing parents: diff changeset	183	lemma appNone[simp]: "app i G maxs rT pc et None = True" by simp
d09d0f160888 exceptions kleing parents: diff changeset	184
d09d0f160888 exceptions kleing parents: diff changeset	185
d09d0f160888 exceptions kleing parents: diff changeset	186	lemma appLoad[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	187	"(app (Load idx) G maxs rT pc et (Some s)) = (\<exists>ST LT. s = (ST,LT) \<and> idx < length LT \<and> LT!idx \<noteq> Err \<and> length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	188	by (cases s, simp)
d09d0f160888 exceptions kleing parents: diff changeset	189
d09d0f160888 exceptions kleing parents: diff changeset	190	lemma appStore[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	191	"(app (Store idx) G maxs rT pc et (Some s)) = (\<exists>ts ST LT. s = (ts#ST,LT) \<and> idx < length LT)"
d09d0f160888 exceptions kleing parents: diff changeset	192	by (cases s, cases "2 < length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	193
d09d0f160888 exceptions kleing parents: diff changeset	194	lemma appLitPush[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	195	"(app (LitPush v) G maxs rT pc et (Some s)) = (\<exists>ST LT. s = (ST,LT) \<and> length ST < maxs \<and> typeof (\<lambda>v. None) v \<noteq> None)"
d09d0f160888 exceptions kleing parents: diff changeset	196	by (cases s, simp)
d09d0f160888 exceptions kleing parents: diff changeset	197
d09d0f160888 exceptions kleing parents: diff changeset	198	lemma appGetField[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	199	"(app (Getfield F C) G maxs rT pc et (Some s)) =
d09d0f160888 exceptions kleing parents: diff changeset	200	(\<exists> oT vT ST LT. s = (oT#ST, LT) \<and> is_class G C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	201	field (G,C) F = Some (C,vT) \<and> G \<turnstile> oT \<preceq> (Class C) \<and> is_class G (Xcpt NullPointer))"
d09d0f160888 exceptions kleing parents: diff changeset	202	by (cases s, cases "2 <length (fst s)", auto dest!: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	203
d09d0f160888 exceptions kleing parents: diff changeset	204	lemma appPutField[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	205	"(app (Putfield F C) G maxs rT pc et (Some s)) =
d09d0f160888 exceptions kleing parents: diff changeset	206	(\<exists> vT vT' oT ST LT. s = (vT#oT#ST, LT) \<and> is_class G C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	207	field (G,C) F = Some (C, vT') \<and> G \<turnstile> oT \<preceq> (Class C) \<and> G \<turnstile> vT \<preceq> vT' \<and> is_class G (Xcpt NullPointer))"
d09d0f160888 exceptions kleing parents: diff changeset	208	by (cases s, cases "2 <length (fst s)", auto dest!: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	209
d09d0f160888 exceptions kleing parents: diff changeset	210	lemma appNew[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	211	"(app (New C) G maxs rT pc et (Some s)) =
d09d0f160888 exceptions kleing parents: diff changeset	212	(\<exists>ST LT. s=(ST,LT) \<and> is_class G C \<and> length ST < maxs \<and> is_class G (Xcpt OutOfMemory))"
d09d0f160888 exceptions kleing parents: diff changeset	213	by (cases s, simp)
d09d0f160888 exceptions kleing parents: diff changeset	214
d09d0f160888 exceptions kleing parents: diff changeset	215	lemma appCheckcast[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	216	"(app (Checkcast C) G maxs rT pc et (Some s)) =
d09d0f160888 exceptions kleing parents: diff changeset	217	(\<exists>rT ST LT. s = (RefT rT#ST,LT) \<and> is_class G C \<and> is_class G (Xcpt ClassCast))"
d09d0f160888 exceptions kleing parents: diff changeset	218	by (cases s, cases "fst s", simp add: app_def) (cases "hd (fst s)", auto)
d09d0f160888 exceptions kleing parents: diff changeset	219
d09d0f160888 exceptions kleing parents: diff changeset	220	lemma appPop[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	221	"(app Pop G maxs rT pc et (Some s)) = (\<exists>ts ST LT. s = (ts#ST,LT))"
d09d0f160888 exceptions kleing parents: diff changeset	222	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	223
d09d0f160888 exceptions kleing parents: diff changeset	224
d09d0f160888 exceptions kleing parents: diff changeset	225	lemma appDup[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	226	"(app Dup G maxs rT pc et (Some s)) = (\<exists>ts ST LT. s = (ts#ST,LT) \<and> 1+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	227	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	228
d09d0f160888 exceptions kleing parents: diff changeset	229
d09d0f160888 exceptions kleing parents: diff changeset	230	lemma appDup_x1[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	231	"(app Dup_x1 G maxs rT pc et (Some s)) = (\<exists>ts1 ts2 ST LT. s = (ts1#ts2#ST,LT) \<and> 2+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	232	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	233
d09d0f160888 exceptions kleing parents: diff changeset	234
d09d0f160888 exceptions kleing parents: diff changeset	235	lemma appDup_x2[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	236	"(app Dup_x2 G maxs rT pc et (Some s)) = (\<exists>ts1 ts2 ts3 ST LT. s = (ts1#ts2#ts3#ST,LT) \<and> 3+length ST < maxs)"
d09d0f160888 exceptions kleing parents: diff changeset	237	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	238
d09d0f160888 exceptions kleing parents: diff changeset	239
d09d0f160888 exceptions kleing parents: diff changeset	240	lemma appSwap[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	241	"app Swap G maxs rT pc et (Some s) = (\<exists>ts1 ts2 ST LT. s = (ts1#ts2#ST,LT))"
d09d0f160888 exceptions kleing parents: diff changeset	242	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	243
d09d0f160888 exceptions kleing parents: diff changeset	244
d09d0f160888 exceptions kleing parents: diff changeset	245	lemma appIAdd[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	246	"app IAdd G maxs rT pc et (Some s) = (\<exists> ST LT. s = (PrimT Integer#PrimT Integer#ST,LT))"
d09d0f160888 exceptions kleing parents: diff changeset	247	(is "?app s = ?P s")
d09d0f160888 exceptions kleing parents: diff changeset	248	proof (cases (open) s)
d09d0f160888 exceptions kleing parents: diff changeset	249	case Pair
d09d0f160888 exceptions kleing parents: diff changeset	250	have "?app (a,b) = ?P (a,b)"
d09d0f160888 exceptions kleing parents: diff changeset	251	proof (cases "a")
d09d0f160888 exceptions kleing parents: diff changeset	252	fix t ts assume a: "a = t#ts"
d09d0f160888 exceptions kleing parents: diff changeset	253	show ?thesis
d09d0f160888 exceptions kleing parents: diff changeset	254	proof (cases t)
d09d0f160888 exceptions kleing parents: diff changeset	255	fix p assume p: "t = PrimT p"
d09d0f160888 exceptions kleing parents: diff changeset	256	show ?thesis
d09d0f160888 exceptions kleing parents: diff changeset	257	proof (cases p)
d09d0f160888 exceptions kleing parents: diff changeset	258	assume ip: "p = Integer"
d09d0f160888 exceptions kleing parents: diff changeset	259	show ?thesis
d09d0f160888 exceptions kleing parents: diff changeset	260	proof (cases ts)
d09d0f160888 exceptions kleing parents: diff changeset	261	fix t' ts' assume t': "ts = t' # ts'"
d09d0f160888 exceptions kleing parents: diff changeset	262	show ?thesis
d09d0f160888 exceptions kleing parents: diff changeset	263	proof (cases t')
d09d0f160888 exceptions kleing parents: diff changeset	264	fix p' assume "t' = PrimT p'"
d09d0f160888 exceptions kleing parents: diff changeset	265	with t' ip p a
d09d0f160888 exceptions kleing parents: diff changeset	266	show ?thesis by - (cases p', auto)
d09d0f160888 exceptions kleing parents: diff changeset	267	qed (auto simp add: a p ip t')
d09d0f160888 exceptions kleing parents: diff changeset	268	qed (auto simp add: a p ip)
d09d0f160888 exceptions kleing parents: diff changeset	269	qed (auto simp add: a p)
d09d0f160888 exceptions kleing parents: diff changeset	270	qed (auto simp add: a)
d09d0f160888 exceptions kleing parents: diff changeset	271	qed auto
d09d0f160888 exceptions kleing parents: diff changeset	272	with Pair show ?thesis by simp
d09d0f160888 exceptions kleing parents: diff changeset	273	qed
d09d0f160888 exceptions kleing parents: diff changeset	274
d09d0f160888 exceptions kleing parents: diff changeset	275
d09d0f160888 exceptions kleing parents: diff changeset	276	lemma appIfcmpeq[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	277	"app (Ifcmpeq b) G maxs rT pc et (Some s) = (\<exists>ts1 ts2 ST LT. s = (ts1#ts2#ST,LT) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	278	((\<exists> p. ts1 = PrimT p \<and> ts2 = PrimT p) \<or> (\<exists>r r'. ts1 = RefT r \<and> ts2 = RefT r')))"
d09d0f160888 exceptions kleing parents: diff changeset	279	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	280
d09d0f160888 exceptions kleing parents: diff changeset	281
d09d0f160888 exceptions kleing parents: diff changeset	282	lemma appReturn[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	283	"app Return G maxs rT pc et (Some s) = (\<exists>T ST LT. s = (T#ST,LT) \<and> (G \<turnstile> T \<preceq> rT))"
d09d0f160888 exceptions kleing parents: diff changeset	284	by (cases s, cases "2 <length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	285
d09d0f160888 exceptions kleing parents: diff changeset	286	lemma appGoto[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	287	"app (Goto branch) G maxs rT pc et (Some s) = True"
d09d0f160888 exceptions kleing parents: diff changeset	288	by simp
d09d0f160888 exceptions kleing parents: diff changeset	289
d09d0f160888 exceptions kleing parents: diff changeset	290	lemma appThrow[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	291	"app Throw G maxs rT pc et (Some s) =
d09d0f160888 exceptions kleing parents: diff changeset	292	(\<exists>T ST LT r. s=(T#ST,LT) \<and> T = RefT r \<and> (\<forall>C \<in> set (match_any G pc et). is_class G C))"
d09d0f160888 exceptions kleing parents: diff changeset	293	by (cases s, cases "2 < length (fst s)", auto dest: 1 2)
d09d0f160888 exceptions kleing parents: diff changeset	294
d09d0f160888 exceptions kleing parents: diff changeset	295	lemma appInvoke[simp]:
d09d0f160888 exceptions kleing parents: diff changeset	296	"app (Invoke C mn fpTs) G maxs rT pc et (Some s) = (\<exists>apTs X ST LT mD' rT' b'.
d09d0f160888 exceptions kleing parents: diff changeset	297	s = ((rev apTs) @ (X # ST), LT) \<and> length apTs = length fpTs \<and> is_class G C \<and>
d09d0f160888 exceptions kleing parents: diff changeset	298	G \<turnstile> X \<preceq> Class C \<and> (\<forall>(aT,fT)\<in>set(zip apTs fpTs). G \<turnstile> aT \<preceq> fT) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	299	method (G,C) (mn,fpTs) = Some (mD', rT', b') \<and>
d09d0f160888 exceptions kleing parents: diff changeset	300	(\<forall>C \<in> set (match_any G pc et). is_class G C))" (is "?app s = ?P s")
d09d0f160888 exceptions kleing parents: diff changeset	301	proof (cases (open) s)
d09d0f160888 exceptions kleing parents: diff changeset	302	case Pair
d09d0f160888 exceptions kleing parents: diff changeset	303	have "?app (a,b) ==> ?P (a,b)"
d09d0f160888 exceptions kleing parents: diff changeset	304	proof -
d09d0f160888 exceptions kleing parents: diff changeset	305	assume app: "?app (a,b)"
d09d0f160888 exceptions kleing parents: diff changeset	306	hence "a = (rev (rev (take (length fpTs) a))) @ (drop (length fpTs) a) \<and>
d09d0f160888 exceptions kleing parents: diff changeset	307	length fpTs < length a" (is "?a \<and> ?l")
d09d0f160888 exceptions kleing parents: diff changeset	308	by (auto simp add: app_def)
d09d0f160888 exceptions kleing parents: diff changeset	309	hence "?a \<and> 0 < length (drop (length fpTs) a)" (is "?a \<and> ?l")
d09d0f160888 exceptions kleing parents: diff changeset	310	by auto
d09d0f160888 exceptions kleing parents: diff changeset	311	hence "?a \<and> ?l \<and> length (rev (take (length fpTs) a)) = length fpTs"
d09d0f160888 exceptions kleing parents: diff changeset	312	by (auto simp add: min_def)
d09d0f160888 exceptions kleing parents: diff changeset	313	hence "\<exists>apTs ST. a = rev apTs @ ST \<and> length apTs = length fpTs \<and> 0 < length ST"
d09d0f160888 exceptions kleing parents: diff changeset	314	by blast
d09d0f160888 exceptions kleing parents: diff changeset	315	hence "\<exists>apTs ST. a = rev apTs @ ST \<and> length apTs = length fpTs \<and> ST \<noteq> []"
d09d0f160888 exceptions kleing parents: diff changeset	316	by blast
d09d0f160888 exceptions kleing parents: diff changeset	317	hence "\<exists>apTs ST. a = rev apTs @ ST \<and> length apTs = length fpTs \<and>
d09d0f160888 exceptions kleing parents: diff changeset	318	(\<exists>X ST'. ST = X#ST')"
d09d0f160888 exceptions kleing parents: diff changeset	319	by (simp add: neq_Nil_conv)
d09d0f160888 exceptions kleing parents: diff changeset	320	hence "\<exists>apTs X ST. a = rev apTs @ X # ST \<and> length apTs = length fpTs"
d09d0f160888 exceptions kleing parents: diff changeset	321	by blast
d09d0f160888 exceptions kleing parents: diff changeset	322	with app
d09d0f160888 exceptions kleing parents: diff changeset	323	show ?thesis by (unfold app_def, clarsimp) blast
d09d0f160888 exceptions kleing parents: diff changeset	324	qed
d09d0f160888 exceptions kleing parents: diff changeset	325	with Pair
d09d0f160888 exceptions kleing parents: diff changeset	326	have "?app s ==> ?P s" by simp
d09d0f160888 exceptions kleing parents: diff changeset	327	moreover
d09d0f160888 exceptions kleing parents: diff changeset	328	have "?P s \<Longrightarrow> ?app s" by (unfold app_def) clarsimp
d09d0f160888 exceptions kleing parents: diff changeset	329	ultimately
d09d0f160888 exceptions kleing parents: diff changeset	330	show ?thesis by blast
d09d0f160888 exceptions kleing parents: diff changeset	331	qed
d09d0f160888 exceptions kleing parents: diff changeset	332
d09d0f160888 exceptions kleing parents: diff changeset	333	lemma effNone:
d09d0f160888 exceptions kleing parents: diff changeset	334	"(pc', s') \<in> set (eff i G pc et None) \<Longrightarrow> s' = None"
d09d0f160888 exceptions kleing parents: diff changeset	335	by (auto simp add: eff_def xcpt_eff_def norm_eff_def)
d09d0f160888 exceptions kleing parents: diff changeset	336
d09d0f160888 exceptions kleing parents: diff changeset	337	lemmas [simp del] = app_def xcpt_app_def
d09d0f160888 exceptions kleing parents: diff changeset	338
d09d0f160888 exceptions kleing parents: diff changeset	339	end

author	wenzelm
	Thu, 10 Jan 2002 16:04:42 +0100
changeset 12702	721b622d8967
parent 12516	d09d0f160888
child 12772	7b7051ae49a0
permissions	-rw-r--r--