Theory Compact_Basis

(*  Title:      HOL/HOLCF/Compact_Basis.thy
    Author:     Brian Huffman
*)

section ‹A compact basis for powerdomains›

theory Compact_Basis
imports Universal
begin

subsection ‹A compact basis for powerdomains›

definition "pd_basis = {S::'a::bifinite compact_basis set. finite S  S  {}}"

typedef 'a::bifinite pd_basis = "pd_basis :: 'a compact_basis set set"
  unfolding pd_basis_def
  apply (rule_tac x="{_}" in exI)
  apply simp
  done

lemma finite_Rep_pd_basis [simp]: "finite (Rep_pd_basis u)"
by (insert Rep_pd_basis [of u, unfolded pd_basis_def]) simp

lemma Rep_pd_basis_nonempty [simp]: "Rep_pd_basis u  {}"
by (insert Rep_pd_basis [of u, unfolded pd_basis_def]) simp

text ‹The powerdomain basis type is countable.›

lemma pd_basis_countable: "f::'a::bifinite pd_basis  nat. inj f"
proof -
  obtain g :: "'a compact_basis  nat" where "inj g"
    using compact_basis.countable ..
  hence image_g_eq: "A B. g ` A = g ` B  A = B"
    by (rule inj_image_eq_iff)
  have "inj (λt. set_encode (g ` Rep_pd_basis t))"
    by (simp add: inj_on_def set_encode_eq image_g_eq Rep_pd_basis_inject)
  thus ?thesis by - (rule exI)
  (* FIXME: why doesn't ".." or "by (rule exI)" work? *)
qed


subsection ‹Unit and plus constructors›

definition
  PDUnit :: "'a::bifinite compact_basis  'a pd_basis" where
  "PDUnit = (λx. Abs_pd_basis {x})"

definition
  PDPlus :: "'a::bifinite pd_basis  'a pd_basis  'a pd_basis" where
  "PDPlus t u = Abs_pd_basis (Rep_pd_basis t  Rep_pd_basis u)"

lemma Rep_PDUnit:
  "Rep_pd_basis (PDUnit x) = {x}"
unfolding PDUnit_def by (rule Abs_pd_basis_inverse) (simp add: pd_basis_def)

lemma Rep_PDPlus:
  "Rep_pd_basis (PDPlus u v) = Rep_pd_basis u  Rep_pd_basis v"
unfolding PDPlus_def by (rule Abs_pd_basis_inverse) (simp add: pd_basis_def)

lemma PDUnit_inject [simp]: "(PDUnit a = PDUnit b) = (a = b)"
unfolding Rep_pd_basis_inject [symmetric] Rep_PDUnit by simp

lemma PDPlus_assoc: "PDPlus (PDPlus t u) v = PDPlus t (PDPlus u v)"
unfolding Rep_pd_basis_inject [symmetric] Rep_PDPlus by (rule Un_assoc)

lemma PDPlus_commute: "PDPlus t u = PDPlus u t"
unfolding Rep_pd_basis_inject [symmetric] Rep_PDPlus by (rule Un_commute)

lemma PDPlus_absorb: "PDPlus t t = t"
unfolding Rep_pd_basis_inject [symmetric] Rep_PDPlus by (rule Un_absorb)

lemma pd_basis_induct1:
  assumes PDUnit: "a. P (PDUnit a)"
  assumes PDPlus: "a t. P t  P (PDPlus (PDUnit a) t)"
  shows "P x"
apply (induct x, unfold pd_basis_def, clarify)
apply (erule (1) finite_ne_induct)
apply (cut_tac a=x in PDUnit)
apply (simp add: PDUnit_def)
apply (drule_tac a=x in PDPlus)
apply (simp add: PDUnit_def PDPlus_def
  Abs_pd_basis_inverse [unfolded pd_basis_def])
done

lemma pd_basis_induct:
  assumes PDUnit: "a. P (PDUnit a)"
  assumes PDPlus: "t u. P t; P u  P (PDPlus t u)"
  shows "P x"
apply (induct x rule: pd_basis_induct1)
apply (rule PDUnit, erule PDPlus [OF PDUnit])
done


subsection ‹Fold operator›

definition
  fold_pd ::
    "('a::bifinite compact_basis  'b::type)  ('b  'b  'b)  'a pd_basis  'b"
  where "fold_pd g f t = semilattice_set.F f (g ` Rep_pd_basis t)"

lemma fold_pd_PDUnit:
  assumes "semilattice f"
  shows "fold_pd g f (PDUnit x) = g x"
proof -
  from assms interpret semilattice_set f by (rule semilattice_set.intro)
  show ?thesis by (simp add: fold_pd_def Rep_PDUnit)
qed

lemma fold_pd_PDPlus:
  assumes "semilattice f"
  shows "fold_pd g f (PDPlus t u) = f (fold_pd g f t) (fold_pd g f u)"
proof -
  from assms interpret semilattice_set f by (rule semilattice_set.intro)
  show ?thesis by (simp add: image_Un fold_pd_def Rep_PDPlus union)
qed

end