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child 18260  5597cfcecd49 
permissions  rwrr 
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(* Title: HOL/Induct/Com 
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ID: $Id$ 
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Author: Lawrence C Paulson, Cambridge University Computer Laboratory 
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Copyright 1997 University of Cambridge 
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Example of Mutual Induction via Iteratived Inductive Definitions: Commands 
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*) 
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14527  9 
header{*Mutual Induction via Iteratived Inductive Definitions*} 
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theory Com imports Main begin 
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typedecl loc 
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types state = "loc => nat" 
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n2n2n = "nat => nat => nat" 
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arities loc :: type 
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datatype 
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exp = N nat 
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 X loc 
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 Op n2n2n exp exp 
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 valOf com exp ("VALOF _ RESULTIS _" 60) 
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and 

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com = SKIP 

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 ":=" loc exp (infixl 60) 
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 Semi com com ("_;;_" [60, 60] 60) 
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 Cond exp com com ("IF _ THEN _ ELSE _" 60) 

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 While exp com ("WHILE _ DO _" 60) 

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14527  32 

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subsection {* Commands *} 

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text{* Execution of commands *} 
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consts exec :: "((exp*state) * (nat*state)) set => ((com*state)*state)set" 
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"@exec" :: "((exp*state) * (nat*state)) set => 
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[com*state,state] => bool" ("_/ [_]> _" [50,0,50] 50) 
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translations "csig [eval]> s" == "(csig,s) \<in> exec eval" 
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4264  42 
syntax eval' :: "[exp*state,nat*state] => 
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((exp*state) * (nat*state)) set => bool" 

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("_/ [_]> _" [50,0,50] 50) 
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translations 
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"esig [eval]> ns" => "(esig,ns) \<in> eval" 
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text{*Command execution. Natural numbers represent Booleans: 0=True, 1=False*} 
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inductive "exec eval" 
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intros 
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Skip: "(SKIP,s) [eval]> s" 
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Assign: "(e,s) [eval]> (v,s') ==> (x := e, s) [eval]> s'(x:=v)" 
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Semi: "[ (c0,s) [eval]> s2; (c1,s2) [eval]> s1 ] 
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==> (c0 ;; c1, s) [eval]> s1" 
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IfTrue: "[ (e,s) [eval]> (0,s'); (c0,s') [eval]> s1 ] 
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==> (IF e THEN c0 ELSE c1, s) [eval]> s1" 
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IfFalse: "[ (e,s) [eval]> (Suc 0, s'); (c1,s') [eval]> s1 ] 
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==> (IF e THEN c0 ELSE c1, s) [eval]> s1" 
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WhileFalse: "(e,s) [eval]> (Suc 0, s1) 
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==> (WHILE e DO c, s) [eval]> s1" 
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WhileTrue: "[ (e,s) [eval]> (0,s1); 
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(c,s1) [eval]> s2; (WHILE e DO c, s2) [eval]> s3 ] 
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==> (WHILE e DO c, s) [eval]> s3" 
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declare exec.intros [intro] 
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inductive_cases 
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[elim!]: "(SKIP,s) [eval]> t" 
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and [elim!]: "(x:=a,s) [eval]> t" 
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and [elim!]: "(c1;;c2, s) [eval]> t" 
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and [elim!]: "(IF e THEN c1 ELSE c2, s) [eval]> t" 
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and exec_WHILE_case: "(WHILE b DO c,s) [eval]> t" 
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text{*Justifies using "exec" in the inductive definition of "eval"*} 
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lemma exec_mono: "A<=B ==> exec(A) <= exec(B)" 
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apply (unfold exec.defs ) 
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apply (rule lfp_mono) 
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apply (assumption  rule basic_monos)+ 
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done 
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ML {* 
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Unify.trace_bound := 30; 
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Unify.search_bound := 60; 
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*} 
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text{*Command execution is functional (deterministic) provided evaluation is*} 
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theorem single_valued_exec: "single_valued ev ==> single_valued(exec ev)" 
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apply (simp add: single_valued_def) 
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apply (intro allI) 
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apply (rule impI) 
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apply (erule exec.induct) 
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apply (blast elim: exec_WHILE_case)+ 
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done 
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14527  105 
subsection {* Expressions *} 
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text{* Evaluation of arithmetic expressions *} 
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consts eval :: "((exp*state) * (nat*state)) set" 
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">" :: "[exp*state,nat*state] => bool" (infixl 50) 
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translations 
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"esig > (n,s)" <= "(esig,n,s) \<in> eval" 
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"esig > ns" == "(esig,ns ) \<in> eval" 
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inductive eval 
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intros 
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N [intro!]: "(N(n),s) > (n,s)" 
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X [intro!]: "(X(x),s) > (s(x),s)" 
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Op [intro]: "[ (e0,s) > (n0,s0); (e1,s0) > (n1,s1) ] 
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==> (Op f e0 e1, s) > (f n0 n1, s1)" 
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valOf [intro]: "[ (c,s) [eval]> s0; (e,s0) > (n,s1) ] 
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==> (VALOF c RESULTIS e, s) > (n, s1)" 
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monos exec_mono 
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inductive_cases 
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[elim!]: "(N(n),sigma) > (n',s')" 
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and [elim!]: "(X(x),sigma) > (n,s')" 
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and [elim!]: "(Op f a1 a2,sigma) > (n,s')" 
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and [elim!]: "(VALOF c RESULTIS e, s) > (n, s1)" 
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lemma var_assign_eval [intro!]: "(X x, s(x:=n)) > (n, s(x:=n))" 
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by (rule fun_upd_same [THEN subst], fast) 
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text{* Make the induction rule look nicer  though eta_contract makes the new 
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version look worse than it is...*} 
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lemma split_lemma: 
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"{((e,s),(n,s')). P e s n s'} = Collect (split (%v. split (split P v)))" 
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by auto 
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text{*New induction rule. Note the form of the VALOF induction hypothesis*} 
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lemma eval_induct: 
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"[ (e,s) > (n,s'); 
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!!n s. P (N n) s n s; 
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!!s x. P (X x) s (s x) s; 
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!!e0 e1 f n0 n1 s s0 s1. 
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[ (e0,s) > (n0,s0); P e0 s n0 s0; 
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(e1,s0) > (n1,s1); P e1 s0 n1 s1 
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] ==> P (Op f e0 e1) s (f n0 n1) s1; 
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!!c e n s s0 s1. 
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[ (c,s) [eval Int {((e,s),(n,s')). P e s n s'}]> s0; 
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(c,s) [eval]> s0; 
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(e,s0) > (n,s1); P e s0 n s1 ] 
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==> P (VALOF c RESULTIS e) s n s1 
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] ==> P e s n s'" 
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163 
apply (erule eval.induct, blast) 
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164 
apply blast 
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165 
apply blast 
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apply (frule Int_lower1 [THEN exec_mono, THEN subsetD]) 
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apply (auto simp add: split_lemma) 
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done 
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169 

3120
c58423c20740
New directory to contain examples of (co)inductive definitions
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170 

13075
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text{*Lemma for Function_eval. The major premise is that (c,s) executes to s1 
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using eval restricted to its functional part. Note that the execution 
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(c,s) [eval]> s2 can use unrestricted eval! The reason is that 
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the execution (c,s) [eval Int {...}]> s1 assures us that execution is 
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functional on the argument (c,s). 
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*} 
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lemma com_Unique: 
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"(c,s) [eval Int {((e,s),(n,t)). \<forall>nt'. (e,s) > nt' > (n,t)=nt'}]> s1 
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==> \<forall>s2. (c,s) [eval]> s2 > s2=s1" 
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180 
apply (erule exec.induct, simp_all) 
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181 
apply blast 
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182 
apply force 
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183 
apply blast 
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184 
apply blast 
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185 
apply blast 
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186 
apply (blast elim: exec_WHILE_case) 
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187 
apply (erule_tac V = "(?c,s2) [?ev]> s3" in thin_rl) 
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188 
apply clarify 
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189 
apply (erule exec_WHILE_case, blast+) 
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190 
done 
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191 

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192 

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text{*Expression evaluation is functional, or deterministic*} 
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194 
theorem single_valued_eval: "single_valued eval" 
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195 
apply (unfold single_valued_def) 
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196 
apply (intro allI, rule impI) 
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apply (simp (no_asm_simp) only: split_tupled_all) 
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198 
apply (erule eval_induct) 
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apply (drule_tac [4] com_Unique) 
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200 
apply (simp_all (no_asm_use)) 
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201 
apply blast+ 
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done 
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203 

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204 

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lemma eval_N_E_lemma: "(e,s) > (v,s') ==> (e = N n) > (v=n & s'=s)" 
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by (erule eval_induct, simp_all) 
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207 

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lemmas eval_N_E [dest!] = eval_N_E_lemma [THEN mp, OF _ refl] 
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209 

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210 

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text{*This theorem says that "WHILE TRUE DO c" cannot terminate*} 
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212 
lemma while_true_E [rule_format]: 
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"(c', s) [eval]> t ==> (c' = WHILE (N 0) DO c) > False" 
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214 
by (erule exec.induct, auto) 
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215 

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216 

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subsection{* Equivalence of IF e THEN c;;(WHILE e DO c) ELSE SKIP and 
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218 
WHILE e DO c *} 
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219 

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lemma while_if1 [rule_format]: 
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221 
"(c',s) [eval]> t 
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==> (c' = WHILE e DO c) > 
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(IF e THEN c;;c' ELSE SKIP, s) [eval]> t" 
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224 
by (erule exec.induct, auto) 
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225 

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lemma while_if2 [rule_format]: 
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"(c',s) [eval]> t 
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==> (c' = IF e THEN c;;(WHILE e DO c) ELSE SKIP) > 
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229 
(WHILE e DO c, s) [eval]> t" 
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230 
by (erule exec.induct, auto) 
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231 

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232 

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233 
theorem while_if: 
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"((IF e THEN c;;(WHILE e DO c) ELSE SKIP, s) [eval]> t) = 
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235 
((WHILE e DO c, s) [eval]> t)" 
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236 
by (blast intro: while_if1 while_if2) 
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237 

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238 

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239 

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240 
subsection{* Equivalence of (IF e THEN c1 ELSE c2);;c 
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241 
and IF e THEN (c1;;c) ELSE (c2;;c) *} 
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242 

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243 
lemma if_semi1 [rule_format]: 
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244 
"(c',s) [eval]> t 
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245 
==> (c' = (IF e THEN c1 ELSE c2);;c) > 
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(IF e THEN (c1;;c) ELSE (c2;;c), s) [eval]> t" 
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247 
by (erule exec.induct, auto) 
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248 

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249 
lemma if_semi2 [rule_format]: 
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250 
"(c',s) [eval]> t 
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==> (c' = IF e THEN (c1;;c) ELSE (c2;;c)) > 
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252 
((IF e THEN c1 ELSE c2);;c, s) [eval]> t" 
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253 
by (erule exec.induct, auto) 
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254 

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theorem if_semi: "(((IF e THEN c1 ELSE c2);;c, s) [eval]> t) = 
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256 
((IF e THEN (c1;;c) ELSE (c2;;c), s) [eval]> t)" 
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257 
by (blast intro: if_semi1 if_semi2) 
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258 

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259 

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260 

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261 
subsection{* Equivalence of VALOF c1 RESULTIS (VALOF c2 RESULTIS e) 
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and VALOF c1;;c2 RESULTIS e 
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263 
*} 
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264 

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265 
lemma valof_valof1 [rule_format]: 
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"(e',s) > (v,s') 
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==> (e' = VALOF c1 RESULTIS (VALOF c2 RESULTIS e)) > 
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(VALOF c1;;c2 RESULTIS e, s) > (v,s')" 
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269 
by (erule eval_induct, auto) 
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270 

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271 

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lemma valof_valof2 [rule_format]: 
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"(e',s) > (v,s') 
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==> (e' = VALOF c1;;c2 RESULTIS e) > 
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(VALOF c1 RESULTIS (VALOF c2 RESULTIS e), s) > (v,s')" 
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276 
by (erule eval_induct, auto) 
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277 

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theorem valof_valof: 
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"((VALOF c1 RESULTIS (VALOF c2 RESULTIS e), s) > (v,s')) = 
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((VALOF c1;;c2 RESULTIS e, s) > (v,s'))" 
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by (blast intro: valof_valof1 valof_valof2) 
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subsection{* Equivalence of VALOF SKIP RESULTIS e and e *} 
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lemma valof_skip1 [rule_format]: 
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"(e',s) > (v,s') 
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==> (e' = VALOF SKIP RESULTIS e) > 
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(e, s) > (v,s')" 
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by (erule eval_induct, auto) 
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lemma valof_skip2: 
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"(e,s) > (v,s') ==> (VALOF SKIP RESULTIS e, s) > (v,s')" 
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by blast 
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theorem valof_skip: 
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"((VALOF SKIP RESULTIS e, s) > (v,s')) = ((e, s) > (v,s'))" 
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by (blast intro: valof_skip1 valof_skip2) 
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subsection{* Equivalence of VALOF x:=e RESULTIS x and e *} 
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lemma valof_assign1 [rule_format]: 
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"(e',s) > (v,s'') 
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==> (e' = VALOF x:=e RESULTIS X x) > 
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(\<exists>s'. (e, s) > (v,s') & (s'' = s'(x:=v)))" 
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apply (erule eval_induct) 
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apply (simp_all del: fun_upd_apply, clarify, auto) 
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done 
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lemma valof_assign2: 
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"(e,s) > (v,s') ==> (VALOF x:=e RESULTIS X x, s) > (v,s'(x:=v))" 
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by blast 
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3120
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end 