(* Title: HOL/HOLCF/IOA/meta_theory/LiveIOA.thy
Author: Olaf Müller
*)
section {* Live I/O automata -- specified by temproal formulas *}
theory LiveIOA
imports TLS
begin
default_sort type
type_synonym
('a, 's) live_ioa = "('a,'s)ioa * ('a,'s)ioa_temp"
definition
validLIOA :: "('a,'s)live_ioa => ('a,'s)ioa_temp => bool" where
"validLIOA AL P = validIOA (fst AL) ((snd AL) .--> P)"
definition
WF :: "('a,'s)ioa => 'a set => ('a,'s)ioa_temp" where
"WF A acts = (<> [] <%(s,a,t) . Enabled A acts s> .--> [] <> <xt2 (plift (%a. a : acts))>)"
definition
SF :: "('a,'s)ioa => 'a set => ('a,'s)ioa_temp" where
"SF A acts = ([] <> <%(s,a,t) . Enabled A acts s> .--> [] <> <xt2 (plift (%a. a : acts))>)"
definition
liveexecutions :: "('a,'s)live_ioa => ('a,'s)execution set" where
"liveexecutions AP = {exec. exec : executions (fst AP) & (exec |== (snd AP))}"
definition
livetraces :: "('a,'s)live_ioa => 'a trace set" where
"livetraces AP = {mk_trace (fst AP)$(snd ex) | ex. ex:liveexecutions AP}"
definition
live_implements :: "('a,'s1)live_ioa => ('a,'s2)live_ioa => bool" where
"live_implements CL AM = ((inp (fst CL) = inp (fst AM)) &
(out (fst CL) = out (fst AM)) &
livetraces CL <= livetraces AM)"
definition
is_live_ref_map :: "('s1 => 's2) => ('a,'s1)live_ioa => ('a,'s2)live_ioa => bool" where
"is_live_ref_map f CL AM =
(is_ref_map f (fst CL ) (fst AM) &
(! exec : executions (fst CL). (exec |== (snd CL)) -->
((corresp_ex (fst AM) f exec) |== (snd AM))))"
lemma live_implements_trans:
"!!LC. [| live_implements (A,LA) (B,LB); live_implements (B,LB) (C,LC) |]
==> live_implements (A,LA) (C,LC)"
apply (unfold live_implements_def)
apply auto
done
subsection "Correctness of live refmap"
lemma live_implements: "[| inp(C)=inp(A); out(C)=out(A);
is_live_ref_map f (C,M) (A,L) |]
==> live_implements (C,M) (A,L)"
apply (simp add: is_live_ref_map_def live_implements_def livetraces_def liveexecutions_def)
apply auto
apply (rule_tac x = "corresp_ex A f ex" in exI)
apply auto
(* Traces coincide, Lemma 1 *)
apply (tactic {* pair_tac @{context} "ex" 1 *})
apply (erule lemma_1 [THEN spec, THEN mp])
apply (simp (no_asm) add: externals_def)
apply (auto)[1]
apply (simp add: executions_def reachable.reachable_0)
(* corresp_ex is execution, Lemma 2 *)
apply (tactic {* pair_tac @{context} "ex" 1 *})
apply (simp add: executions_def)
(* start state *)
apply (rule conjI)
apply (simp add: is_ref_map_def corresp_ex_def)
(* is-execution-fragment *)
apply (erule lemma_2 [THEN spec, THEN mp])
apply (simp add: reachable.reachable_0)
done
end