src/HOL/Induct/Com.thy

moving UNIV = ... equations to their proper theories

(*  Title:      HOL/Induct/Com.thy
    Author:     Lawrence C Paulson, Cambridge University Computer Laboratory
    Copyright   1997  University of Cambridge

Example of Mutual Induction via Iteratived Inductive Definitions: Commands
*)

header{*Mutual Induction via Iteratived Inductive Definitions*}

theory Com imports Main begin

typedecl loc
type_synonym state = "loc => nat"

datatype
  exp = N nat
      | X loc
      | Op "nat => nat => nat" exp exp
      | valOf com exp          ("VALOF _ RESULTIS _"  60)
and
  com = SKIP
      | Assign loc exp         (infixl ":=" 60)
      | Semi com com           ("_;;_"  [60, 60] 60)
      | Cond exp com com       ("IF _ THEN _ ELSE _"  60)
      | While exp com          ("WHILE _ DO _"  60)


subsection {* Commands *}

text{* Execution of commands *}

abbreviation (input)
  generic_rel  ("_/ -|[_]-> _" [50,0,50] 50)  where
  "esig -|[eval]-> ns == (esig,ns) \<in> eval"

text{*Command execution.  Natural numbers represent Booleans: 0=True, 1=False*}

inductive_set
  exec :: "((exp*state) * (nat*state)) set => ((com*state)*state)set"
  and exec_rel :: "com * state => ((exp*state) * (nat*state)) set => state => bool"
    ("_/ -[_]-> _" [50,0,50] 50)
  for eval :: "((exp*state) * (nat*state)) set"
  where
    "csig -[eval]-> s == (csig,s) \<in> exec eval"

  | Skip:    "(SKIP,s) -[eval]-> s"

  | Assign:  "(e,s) -|[eval]-> (v,s') ==> (x := e, s) -[eval]-> s'(x:=v)"

  | Semi:    "[| (c0,s) -[eval]-> s2; (c1,s2) -[eval]-> s1 |]
             ==> (c0 ;; c1, s) -[eval]-> s1"

  | IfTrue: "[| (e,s) -|[eval]-> (0,s');  (c0,s') -[eval]-> s1 |]
             ==> (IF e THEN c0 ELSE c1, s) -[eval]-> s1"

  | IfFalse: "[| (e,s) -|[eval]->  (Suc 0, s');  (c1,s') -[eval]-> s1 |]
              ==> (IF e THEN c0 ELSE c1, s) -[eval]-> s1"

  | WhileFalse: "(e,s) -|[eval]-> (Suc 0, s1)
                 ==> (WHILE e DO c, s) -[eval]-> s1"

  | WhileTrue:  "[| (e,s) -|[eval]-> (0,s1);
                    (c,s1) -[eval]-> s2;  (WHILE e DO c, s2) -[eval]-> s3 |]
                 ==> (WHILE e DO c, s) -[eval]-> s3"

declare exec.intros [intro]


inductive_cases
        [elim!]: "(SKIP,s) -[eval]-> t"
    and [elim!]: "(x:=a,s) -[eval]-> t"
    and [elim!]: "(c1;;c2, s) -[eval]-> t"
    and [elim!]: "(IF e THEN c1 ELSE c2, s) -[eval]-> t"
    and exec_WHILE_case: "(WHILE b DO c,s) -[eval]-> t"


text{*Justifies using "exec" in the inductive definition of "eval"*}
lemma exec_mono: "A<=B ==> exec(A) <= exec(B)"
apply (rule subsetI)
apply (simp add: split_paired_all)
apply (erule exec.induct)
apply blast+
done

lemma [pred_set_conv]:
  "((\<lambda>x x' y y'. ((x, x'), (y, y')) \<in> R) <= (\<lambda>x x' y y'. ((x, x'), (y, y')) \<in> S)) = (R <= S)"
  by (auto simp add: le_fun_def le_bool_def mem_def)

lemma [pred_set_conv]:
  "((\<lambda>x x' y. ((x, x'), y) \<in> R) <= (\<lambda>x x' y. ((x, x'), y) \<in> S)) = (R <= S)"
  by (auto simp add: le_fun_def le_bool_def mem_def)

text{*Command execution is functional (deterministic) provided evaluation is*}
theorem single_valued_exec: "single_valued ev ==> single_valued(exec ev)"
apply (simp add: single_valued_def)
apply (intro allI)
apply (rule impI)
apply (erule exec.induct)
apply (blast elim: exec_WHILE_case)+
done


subsection {* Expressions *}

text{* Evaluation of arithmetic expressions *}

inductive_set
  eval    :: "((exp*state) * (nat*state)) set"
  and eval_rel :: "[exp*state,nat*state] => bool"  (infixl "-|->" 50)
  where
    "esig -|-> ns == (esig, ns) \<in> eval"

  | N [intro!]: "(N(n),s) -|-> (n,s)"

  | X [intro!]: "(X(x),s) -|-> (s(x),s)"

  | Op [intro]: "[| (e0,s) -|-> (n0,s0);  (e1,s0)  -|-> (n1,s1) |]
                 ==> (Op f e0 e1, s) -|-> (f n0 n1, s1)"

  | valOf [intro]: "[| (c,s) -[eval]-> s0;  (e,s0)  -|-> (n,s1) |]
                    ==> (VALOF c RESULTIS e, s) -|-> (n, s1)"

  monos exec_mono


inductive_cases
        [elim!]: "(N(n),sigma) -|-> (n',s')"
    and [elim!]: "(X(x),sigma) -|-> (n,s')"
    and [elim!]: "(Op f a1 a2,sigma)  -|-> (n,s')"
    and [elim!]: "(VALOF c RESULTIS e, s) -|-> (n, s1)"


lemma var_assign_eval [intro!]: "(X x, s(x:=n)) -|-> (n, s(x:=n))"
by (rule fun_upd_same [THEN subst], fast)


text{* Make the induction rule look nicer -- though @{text eta_contract} makes the new
    version look worse than it is...*}

lemma split_lemma:
     "{((e,s),(n,s')). P e s n s'} = Collect (split (%v. split (split P v)))"
by auto

text{*New induction rule.  Note the form of the VALOF induction hypothesis*}
lemma eval_induct
  [case_names N X Op valOf, consumes 1, induct set: eval]:
  "[| (e,s) -|-> (n,s');
      !!n s. P (N n) s n s;
      !!s x. P (X x) s (s x) s;
      !!e0 e1 f n0 n1 s s0 s1.
         [| (e0,s) -|-> (n0,s0); P e0 s n0 s0;
            (e1,s0) -|-> (n1,s1); P e1 s0 n1 s1
         |] ==> P (Op f e0 e1) s (f n0 n1) s1;
      !!c e n s s0 s1.
         [| (c,s) -[eval Int {((e,s),(n,s')). P e s n s'}]-> s0;
            (c,s) -[eval]-> s0;
            (e,s0) -|-> (n,s1); P e s0 n s1 |]
         ==> P (VALOF c RESULTIS e) s n s1
   |] ==> P e s n s'"
apply (induct set: eval)
apply blast
apply blast
apply blast
apply (frule Int_lower1 [THEN exec_mono, THEN subsetD])
apply (auto simp add: split_lemma)
done


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


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

lemma eval_N_E [dest!]: "(N n, s) -|-> (v, s') ==> (v = n & s' = s)"
  by (induct e == "N n" s v s' set: eval) simp_all

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


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

lemma while_if1:
     "(c',s) -[eval]-> t
      ==> c' = WHILE e DO c ==>
          (IF e THEN c;;c' ELSE SKIP, s) -[eval]-> t"
  by (induct set: exec) auto

lemma while_if2:
     "(c',s) -[eval]-> t
      ==> c' = IF e THEN c;;(WHILE e DO c) ELSE SKIP ==>
          (WHILE e DO c, s) -[eval]-> t"
  by (induct set: exec) auto


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



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

lemma if_semi1:
     "(c',s) -[eval]-> t
      ==> c' = (IF e THEN c1 ELSE c2);;c ==>
          (IF e THEN (c1;;c) ELSE (c2;;c), s) -[eval]-> t"
  by (induct set: exec) auto

lemma if_semi2:
     "(c',s) -[eval]-> t
      ==> c' = IF e THEN (c1;;c) ELSE (c2;;c) ==>
          ((IF e THEN c1 ELSE c2);;c, s) -[eval]-> t"
  by (induct set: exec) auto

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



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

lemma valof_valof1:
     "(e',s) -|-> (v,s')
      ==> e' = VALOF c1 RESULTIS (VALOF c2 RESULTIS e) ==>
          (VALOF c1;;c2 RESULTIS e, s) -|-> (v,s')"
  by (induct set: eval) auto

lemma valof_valof2:
     "(e',s) -|-> (v,s')
      ==> e' = VALOF c1;;c2 RESULTIS e ==>
          (VALOF c1 RESULTIS (VALOF c2 RESULTIS e), s) -|-> (v,s')"
  by (induct set: eval) auto

theorem valof_valof:
     "((VALOF c1 RESULTIS (VALOF c2 RESULTIS e), s) -|-> (v,s'))  =
      ((VALOF c1;;c2 RESULTIS e, s) -|-> (v,s'))"
  by (blast intro: valof_valof1 valof_valof2)


subsection{* Equivalence of  VALOF SKIP RESULTIS e  and  e *}

lemma valof_skip1:
     "(e',s) -|-> (v,s')
      ==> e' = VALOF SKIP RESULTIS e ==>
          (e, s) -|-> (v,s')"
  by (induct set: eval) auto

lemma valof_skip2:
    "(e,s) -|-> (v,s') ==> (VALOF SKIP RESULTIS e, s) -|-> (v,s')"
  by blast

theorem valof_skip:
    "((VALOF SKIP RESULTIS e, s) -|-> (v,s'))  =  ((e, s) -|-> (v,s'))"
  by (blast intro: valof_skip1 valof_skip2)


subsection{* Equivalence of  VALOF x:=e RESULTIS x  and  e *}

lemma valof_assign1:
     "(e',s) -|-> (v,s'')
      ==> e' = VALOF x:=e RESULTIS X x ==>
          (\<exists>s'. (e, s) -|-> (v,s') & (s'' = s'(x:=v)))"
  by (induct set: eval) (simp_all del: fun_upd_apply, clarify, auto)

lemma valof_assign2:
    "(e,s) -|-> (v,s') ==> (VALOF x:=e RESULTIS X x, s) -|-> (v,s'(x:=v))"
  by blast

end