(* Title: HOL/MicroJava/J/WellType.thy
Author: David von Oheimb
Copyright 1999 Technische Universitaet Muenchen
*)
section \<open>Well-typedness Constraints\<close>
theory WellType imports Term WellForm begin
text \<open>
the formulation of well-typedness of method calls given below (as well as
the Java Specification 1.0) is a little too restrictive: Is does not allow
methods of class Object to be called upon references of interface type.
\begin{description}
\item[simplifications:]\ \\
\begin{itemize}
\item the type rules include all static checks on expressions and statements,
e.g.\ definedness of names (of parameters, locals, fields, methods)
\end{itemize}
\end{description}
\<close>
text "local variables, including method parameters and This:"
type_synonym lenv = "vname \<rightharpoonup> ty"
type_synonym 'c env = "'c prog \<times> lenv"
abbreviation (input)
prg :: "'c env => 'c prog"
where "prg == fst"
abbreviation (input)
localT :: "'c env => (vname \<rightharpoonup> ty)"
where "localT == snd"
definition more_spec :: "'c prog \<Rightarrow> (ty \<times> 'x) \<times> ty list \<Rightarrow> (ty \<times> 'x) \<times> ty list \<Rightarrow> bool"
where "more_spec G == \<lambda>((d,h),pTs). \<lambda>((d',h'),pTs'). G\<turnstile>d\<preceq>d' \<and>
list_all2 (\<lambda>T T'. G\<turnstile>T\<preceq>T') pTs pTs'"
definition appl_methds :: "'c prog \<Rightarrow> cname \<Rightarrow> sig \<Rightarrow> ((ty \<times> ty) \<times> ty list) set"
\<comment> "applicable methods, cf. 15.11.2.1"
where "appl_methds G C == \<lambda>(mn, pTs).
{((Class md,rT),pTs') |md rT mb pTs'.
method (G,C) (mn, pTs') = Some (md,rT,mb) \<and>
list_all2 (\<lambda>T T'. G\<turnstile>T\<preceq>T') pTs pTs'}"
definition max_spec :: "'c prog \<Rightarrow> cname \<Rightarrow> sig \<Rightarrow> ((ty \<times> ty) \<times> ty list) set"
\<comment> "maximally specific methods, cf. 15.11.2.2"
where "max_spec G C sig == {m. m \<in>appl_methds G C sig \<and>
(\<forall>m'\<in>appl_methds G C sig.
more_spec G m' m --> m' = m)}"
lemma max_spec2appl_meths:
"x \<in> max_spec G C sig ==> x \<in> appl_methds G C sig"
apply (unfold max_spec_def)
apply (fast)
done
lemma appl_methsD:
"((md,rT),pTs')\<in>appl_methds G C (mn, pTs) ==>
\<exists>D b. md = Class D \<and> method (G,C) (mn, pTs') = Some (D,rT,b)
\<and> list_all2 (\<lambda>T T'. G\<turnstile>T\<preceq>T') pTs pTs'"
apply (unfold appl_methds_def)
apply (fast)
done
lemmas max_spec2mheads = insertI1 [THEN [2] equalityD2 [THEN subsetD],
THEN max_spec2appl_meths, THEN appl_methsD]
primrec typeof :: "(loc => ty option) => val => ty option"
where
"typeof dt Unit = Some (PrimT Void)"
| "typeof dt Null = Some NT"
| "typeof dt (Bool b) = Some (PrimT Boolean)"
| "typeof dt (Intg i) = Some (PrimT Integer)"
| "typeof dt (Addr a) = dt a"
lemma is_type_typeof [rule_format (no_asm), simp]:
"(\<forall>a. v \<noteq> Addr a) --> (\<exists>T. typeof t v = Some T \<and> is_type G T)"
apply (rule val.induct)
apply auto
done
lemma typeof_empty_is_type [rule_format (no_asm)]:
"typeof (\<lambda>a. None) v = Some T \<longrightarrow> is_type G T"
apply (rule val.induct)
apply auto
done
lemma typeof_default_val: "\<exists>T. (typeof dt (default_val ty) = Some T) \<and> G\<turnstile> T \<preceq> ty"
apply (case_tac ty)
apply (rename_tac prim_ty, case_tac prim_ty)
apply auto
done
type_synonym
java_mb = "vname list \<times> (vname \<times> ty) list \<times> stmt \<times> expr"
\<comment> "method body with parameter names, local variables, block, result expression."
\<comment> "local variables might include This, which is hidden anyway"
inductive
ty_expr :: "'c env => expr => ty => bool" ("_ \<turnstile> _ :: _" [51, 51, 51] 50)
and ty_exprs :: "'c env => expr list => ty list => bool" ("_ \<turnstile> _ [::] _" [51, 51, 51] 50)
and wt_stmt :: "'c env => stmt => bool" ("_ \<turnstile> _ \<surd>" [51, 51] 50)
where
NewC: "[| is_class (prg E) C |] ==>
E\<turnstile>NewC C::Class C" \<comment> "cf. 15.8"
\<comment> "cf. 15.15"
| Cast: "[| E\<turnstile>e::C; is_class (prg E) D;
prg E\<turnstile>C\<preceq>? Class D |] ==>
E\<turnstile>Cast D e:: Class D"
\<comment> "cf. 15.7.1"
| Lit: "[| typeof (\<lambda>v. None) x = Some T |] ==>
E\<turnstile>Lit x::T"
\<comment> "cf. 15.13.1"
| LAcc: "[| localT E v = Some T; is_type (prg E) T |] ==>
E\<turnstile>LAcc v::T"
| BinOp:"[| E\<turnstile>e1::T;
E\<turnstile>e2::T;
if bop = Eq then T' = PrimT Boolean
else T' = T \<and> T = PrimT Integer|] ==>
E\<turnstile>BinOp bop e1 e2::T'"
\<comment> "cf. 15.25, 15.25.1"
| LAss: "[| v ~= This;
E\<turnstile>LAcc v::T;
E\<turnstile>e::T';
prg E\<turnstile>T'\<preceq>T |] ==>
E\<turnstile>v::=e::T'"
\<comment> "cf. 15.10.1"
| FAcc: "[| E\<turnstile>a::Class C;
field (prg E,C) fn = Some (fd,fT) |] ==>
E\<turnstile>{fd}a..fn::fT"
\<comment> "cf. 15.25, 15.25.1"
| FAss: "[| E\<turnstile>{fd}a..fn::T;
E\<turnstile>v ::T';
prg E\<turnstile>T'\<preceq>T |] ==>
E\<turnstile>{fd}a..fn:=v::T'"
\<comment> "cf. 15.11.1, 15.11.2, 15.11.3"
| Call: "[| E\<turnstile>a::Class C;
E\<turnstile>ps[::]pTs;
max_spec (prg E) C (mn, pTs) = {((md,rT),pTs')} |] ==>
E\<turnstile>{C}a..mn({pTs'}ps)::rT"
\<comment> "well-typed expression lists"
\<comment> "cf. 15.11.???"
| Nil: "E\<turnstile>[][::][]"
\<comment> "cf. 15.11.???"
| Cons:"[| E\<turnstile>e::T;
E\<turnstile>es[::]Ts |] ==>
E\<turnstile>e#es[::]T#Ts"
\<comment> "well-typed statements"
| Skip:"E\<turnstile>Skip\<surd>"
| Expr:"[| E\<turnstile>e::T |] ==>
E\<turnstile>Expr e\<surd>"
| Comp:"[| E\<turnstile>s1\<surd>;
E\<turnstile>s2\<surd> |] ==>
E\<turnstile>s1;; s2\<surd>"
\<comment> "cf. 14.8"
| Cond:"[| E\<turnstile>e::PrimT Boolean;
E\<turnstile>s1\<surd>;
E\<turnstile>s2\<surd> |] ==>
E\<turnstile>If(e) s1 Else s2\<surd>"
\<comment> "cf. 14.10"
| Loop:"[| E\<turnstile>e::PrimT Boolean;
E\<turnstile>s\<surd> |] ==>
E\<turnstile>While(e) s\<surd>"
definition wf_java_mdecl :: "'c prog => cname => java_mb mdecl => bool" where
"wf_java_mdecl G C == \<lambda>((mn,pTs),rT,(pns,lvars,blk,res)).
length pTs = length pns \<and>
distinct pns \<and>
unique lvars \<and>
This \<notin> set pns \<and> This \<notin> set (map fst lvars) \<and>
(\<forall>pn\<in>set pns. map_of lvars pn = None) \<and>
(\<forall>(vn,T)\<in>set lvars. is_type G T) &
(let E = (G,map_of lvars(pns[\<mapsto>]pTs)(This\<mapsto>Class C)) in
E\<turnstile>blk\<surd> \<and> (\<exists>T. E\<turnstile>res::T \<and> G\<turnstile>T\<preceq>rT))"
abbreviation "wf_java_prog == wf_prog wf_java_mdecl"
lemma wf_java_prog_wf_java_mdecl: "\<lbrakk>
wf_java_prog G; (C, D, fds, mths) \<in> set G; jmdcl \<in> set mths \<rbrakk>
\<Longrightarrow> wf_java_mdecl G C jmdcl"
apply (simp only: wf_prog_def)
apply (erule conjE)+
apply (drule bspec, assumption)
apply (simp add: wf_cdecl_mdecl_def split_beta)
done
lemma wt_is_type: "(E\<turnstile>e::T \<longrightarrow> ws_prog (prg E) \<longrightarrow> is_type (prg E) T) \<and>
(E\<turnstile>es[::]Ts \<longrightarrow> ws_prog (prg E) \<longrightarrow> Ball (set Ts) (is_type (prg E))) \<and>
(E\<turnstile>c \<surd> \<longrightarrow> True)"
apply (rule ty_expr_ty_exprs_wt_stmt.induct)
apply auto
apply ( erule typeof_empty_is_type)
apply ( simp split: if_split_asm)
apply ( drule field_fields)
apply ( drule (1) fields_is_type)
apply ( simp (no_asm_simp))
apply (assumption)
apply (auto dest!: max_spec2mheads method_wf_mhead is_type_rTI
simp add: wf_mdecl_def)
done
lemmas ty_expr_is_type = wt_is_type [THEN conjunct1,THEN mp, rule_format]
lemma expr_class_is_class: "
\<lbrakk>ws_prog (prg E); E \<turnstile> e :: Class C\<rbrakk> \<Longrightarrow> is_class (prg E) C"
by (frule ty_expr_is_type, assumption, simp)
end