(* Title: HOL/NanoJava/TypeRel.thy
ID: $Id$
Author: David von Oheimb
Copyright 2001 Technische Universitaet Muenchen
*)
header "Type relations"
theory TypeRel imports Decl begin
consts
widen :: "(ty \<times> ty ) set" --{* widening *}
subcls1 :: "(cname \<times> cname) set" --{* subclass *}
syntax (xsymbols)
widen :: "[ty , ty ] => bool" ("_ \<preceq> _" [71,71] 70)
subcls1 :: "[cname, cname] => bool" ("_ \<prec>C1 _" [71,71] 70)
subcls :: "[cname, cname] => bool" ("_ \<preceq>C _" [71,71] 70)
syntax
widen :: "[ty , ty ] => bool" ("_ <= _" [71,71] 70)
subcls1 :: "[cname, cname] => bool" ("_ <=C1 _" [71,71] 70)
subcls :: "[cname, cname] => bool" ("_ <=C _" [71,71] 70)
translations
"C \<prec>C1 D" == "(C,D) \<in> subcls1"
"C \<preceq>C D" == "(C,D) \<in> subcls1^*"
"S \<preceq> T" == "(S,T) \<in> widen"
consts
method :: "cname => (mname \<rightharpoonup> methd)"
field :: "cname => (fname \<rightharpoonup> ty)"
subsection "Declarations and properties not used in the meta theory"
text{* Direct subclass relation *}
defs
subcls1_def: "subcls1 \<equiv> {(C,D). C\<noteq>Object \<and> (\<exists>c. class C = Some c \<and> super c=D)}"
text{* Widening, viz. method invocation conversion *}
inductive widen intros
refl [intro!, simp]: "T \<preceq> T"
subcls : "C\<preceq>C D \<Longrightarrow> Class C \<preceq> Class D"
null [intro!]: "NT \<preceq> R"
lemma subcls1D:
"C\<prec>C1D \<Longrightarrow> C \<noteq> Object \<and> (\<exists>c. class C = Some c \<and> super c=D)"
apply (unfold subcls1_def)
apply auto
done
lemma subcls1I: "\<lbrakk>class C = Some m; super m = D; C \<noteq> Object\<rbrakk> \<Longrightarrow> C\<prec>C1D"
apply (unfold subcls1_def)
apply auto
done
lemma subcls1_def2:
"subcls1 =
(SIGMA C: {C. is_class C} . {D. C\<noteq>Object \<and> super (the (class C)) = D})"
apply (unfold subcls1_def is_class_def)
apply auto
done
lemma finite_subcls1: "finite subcls1"
apply(subst subcls1_def2)
apply(rule finite_SigmaI [OF finite_is_class])
apply(rule_tac B = "{super (the (class C))}" in finite_subset)
apply auto
done
constdefs
ws_prog :: "bool"
"ws_prog \<equiv> \<forall>(C,c)\<in>set Prog. C\<noteq>Object \<longrightarrow>
is_class (super c) \<and> (super c,C)\<notin>subcls1^+"
lemma ws_progD: "\<lbrakk>class C = Some c; C\<noteq>Object; ws_prog\<rbrakk> \<Longrightarrow>
is_class (super c) \<and> (super c,C)\<notin>subcls1^+"
apply (unfold ws_prog_def class_def)
apply (drule_tac map_of_SomeD)
apply auto
done
lemma subcls1_irrefl_lemma1: "ws_prog \<Longrightarrow> subcls1^-1 \<inter> subcls1^+ = {}"
by (fast dest: subcls1D ws_progD)
(* irrefl_tranclI in Transitive_Closure.thy is more general *)
lemma irrefl_tranclI': "r^-1 Int r^+ = {} ==> !x. (x, x) ~: r^+"
by(blast elim: tranclE dest: trancl_into_rtrancl)
lemmas subcls1_irrefl_lemma2 = subcls1_irrefl_lemma1 [THEN irrefl_tranclI']
lemma subcls1_irrefl: "\<lbrakk>(x, y) \<in> subcls1; ws_prog\<rbrakk> \<Longrightarrow> x \<noteq> y"
apply (rule irrefl_trancl_rD)
apply (rule subcls1_irrefl_lemma2)
apply auto
done
lemmas subcls1_acyclic = subcls1_irrefl_lemma2 [THEN acyclicI, standard]
lemma wf_subcls1: "ws_prog \<Longrightarrow> wf (subcls1\<inverse>)"
by (auto intro: finite_acyclic_wf_converse finite_subcls1 subcls1_acyclic)
consts class_rec ::"cname \<Rightarrow> (class \<Rightarrow> ('a \<times> 'b) list) \<Rightarrow> ('a \<rightharpoonup> 'b)"
recdef (permissive) class_rec "subcls1\<inverse>"
"class_rec C = (\<lambda>f. case class C of None \<Rightarrow> arbitrary
| Some m \<Rightarrow> if wf (subcls1\<inverse>)
then (if C=Object then empty else class_rec (super m) f) ++ map_of (f m)
else arbitrary)"
(hints intro: subcls1I)
lemma class_rec: "\<lbrakk>class C = Some m; ws_prog\<rbrakk> \<Longrightarrow>
class_rec C f = (if C = Object then empty else class_rec (super m) f) ++
map_of (f m)";
apply (drule wf_subcls1)
apply (rule class_rec.simps [THEN trans [THEN fun_cong]])
apply assumption
apply simp
done
--{* Methods of a class, with inheritance and hiding *}
defs method_def: "method C \<equiv> class_rec C methods"
lemma method_rec: "\<lbrakk>class C = Some m; ws_prog\<rbrakk> \<Longrightarrow>
method C = (if C=Object then empty else method (super m)) ++ map_of (methods m)"
apply (unfold method_def)
apply (erule (1) class_rec [THEN trans]);
apply simp
done
--{* Fields of a class, with inheritance and hiding *}
defs field_def: "field C \<equiv> class_rec C flds"
lemma flds_rec: "\<lbrakk>class C = Some m; ws_prog\<rbrakk> \<Longrightarrow>
field C = (if C=Object then empty else field (super m)) ++ map_of (flds m)"
apply (unfold field_def)
apply (erule (1) class_rec [THEN trans]);
apply simp
done
end