(* Title: HOL/HOLCF/IOA/meta_theory/Asig.thy
Author: Olaf Müller, Tobias Nipkow & Konrad Slind
*)
section \<open>Action signatures\<close>
theory Asig
imports Main
begin
type_synonym
'a signature = "('a set * 'a set * 'a set)"
definition
inputs :: "'action signature => 'action set" where
asig_inputs_def: "inputs = fst"
definition
outputs :: "'action signature => 'action set" where
asig_outputs_def: "outputs = (fst o snd)"
definition
internals :: "'action signature => 'action set" where
asig_internals_def: "internals = (snd o snd)"
definition
actions :: "'action signature => 'action set" where
"actions(asig) = (inputs(asig) Un outputs(asig) Un internals(asig))"
definition
externals :: "'action signature => 'action set" where
"externals(asig) = (inputs(asig) Un outputs(asig))"
definition
locals :: "'action signature => 'action set" where
"locals asig = ((internals asig) Un (outputs asig))"
definition
is_asig :: "'action signature => bool" where
"is_asig(triple) =
((inputs(triple) Int outputs(triple) = {}) &
(outputs(triple) Int internals(triple) = {}) &
(inputs(triple) Int internals(triple) = {}))"
definition
mk_ext_asig :: "'action signature => 'action signature" where
"mk_ext_asig(triple) = (inputs(triple), outputs(triple), {})"
lemmas asig_projections = asig_inputs_def asig_outputs_def asig_internals_def
lemma asig_triple_proj:
"(outputs (a,b,c) = b) &
(inputs (a,b,c) = a) &
(internals (a,b,c) = c)"
apply (simp add: asig_projections)
done
lemma int_and_ext_is_act: "[| a~:internals(S) ;a~:externals(S)|] ==> a~:actions(S)"
apply (simp add: externals_def actions_def)
done
lemma ext_is_act: "[|a:externals(S)|] ==> a:actions(S)"
apply (simp add: externals_def actions_def)
done
lemma int_is_act: "[|a:internals S|] ==> a:actions S"
apply (simp add: asig_internals_def actions_def)
done
lemma inp_is_act: "[|a:inputs S|] ==> a:actions S"
apply (simp add: asig_inputs_def actions_def)
done
lemma out_is_act: "[|a:outputs S|] ==> a:actions S"
apply (simp add: asig_outputs_def actions_def)
done
lemma ext_and_act: "(x: actions S & x : externals S) = (x: externals S)"
apply (fast intro!: ext_is_act)
done
lemma not_ext_is_int: "[|is_asig S;x: actions S|] ==> (x~:externals S) = (x: internals S)"
apply (simp add: actions_def is_asig_def externals_def)
apply blast
done
lemma not_ext_is_int_or_not_act: "is_asig S ==> (x~:externals S) = (x: internals S | x~:actions S)"
apply (simp add: actions_def is_asig_def externals_def)
apply blast
done
lemma int_is_not_ext:
"[| is_asig (S); x:internals S |] ==> x~:externals S"
apply (unfold externals_def actions_def is_asig_def)
apply simp
apply blast
done
end