(* Title: HOL/IMPP/Com.thy
ID: $Id$
Author: David von Oheimb (based on a theory by Tobias Nipkow et al), TUM
Copyright 1999 TUM
*)
header {* Semantics of arithmetic and boolean expressions, Syntax of commands *}
theory Com
imports Main
begin
types val = nat (* for the meta theory, this may be anything, but with
current Isabelle, types cannot be refined later *)
typedecl glb
typedecl loc
consts
Arg :: loc
Res :: loc
datatype vname = Glb glb | Loc loc
types globs = "glb => val"
locals = "loc => val"
datatype state = st globs locals
(* for the meta theory, the following would be sufficient:
typedecl state
consts st :: "[globs , locals] => state"
*)
types aexp = "state => val"
bexp = "state => bool"
typedecl pname
datatype com
= SKIP
| Ass vname aexp ("_:==_" [65, 65 ] 60)
| Local loc aexp com ("LOCAL _:=_ IN _" [65, 0, 61] 60)
| Semi com com ("_;; _" [59, 60 ] 59)
| Cond bexp com com ("IF _ THEN _ ELSE _" [65, 60, 61] 60)
| While bexp com ("WHILE _ DO _" [65, 61] 60)
| BODY pname
| Call vname pname aexp ("_:=CALL _'(_')" [65, 65, 0] 60)
consts bodies :: "(pname * com) list"(* finitely many procedure definitions *)
body :: " pname ~=> com"
defs body_def: "body == map_of bodies"
(* Well-typedness: all procedures called must exist *)
consts WTs :: "com set"
syntax WT :: "com => bool"
translations "WT c" == "c : WTs"
inductive WTs intros
Skip: "WT SKIP"
Assign: "WT (X :== a)"
Local: "WT c ==>
WT (LOCAL Y := a IN c)"
Semi: "[| WT c0; WT c1 |] ==>
WT (c0;; c1)"
If: "[| WT c0; WT c1 |] ==>
WT (IF b THEN c0 ELSE c1)"
While: "WT c ==>
WT (WHILE b DO c)"
Body: "body pn ~= None ==>
WT (BODY pn)"
Call: "WT (BODY pn) ==>
WT (X:=CALL pn(a))"
inductive_cases WTs_elim_cases:
"WT SKIP" "WT (X:==a)" "WT (LOCAL Y:=a IN c)"
"WT (c1;;c2)" "WT (IF b THEN c1 ELSE c2)" "WT (WHILE b DO c)"
"WT (BODY P)" "WT (X:=CALL P(a))"
constdefs
WT_bodies :: bool
"WT_bodies == !(pn,b):set bodies. WT b"
ML {* val make_imp_tac = EVERY'[rtac mp, fn i => atac (i+1), etac thin_rl] *}
lemma finite_dom_body: "finite (dom body)"
apply (unfold body_def)
apply (rule finite_dom_map_of)
done
lemma WT_bodiesD: "[| WT_bodies; body pn = Some b |] ==> WT b"
apply (unfold WT_bodies_def body_def)
apply (drule map_of_SomeD)
apply fast
done
declare WTs_elim_cases [elim!]
end