Quelle Representable.thy Sprache: Isabelle

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

section ‹Representable domains›

theory Representable
imports Algebraic Map_Functions "HOL-Library.Countable"
begin

subsection ‹Class of representable domains›

text ‹
  We define a ``domain'' as a pcpo that is isomorphic to some
  algebraic deflation over the universal domain; this is equivalent
  to being omega-bifinite.

  A predomain is a cpo that, when lifted, becomes a domain.
  Predomains are represented by deflations over a lifted universal
  domain type.
›

class predomain_syn = cpo +
  fixes liftemb :: "'a\<^sub>\ \ udom\<^sub>\"
  fixes liftprj :: "udom\<^sub>\ \ 'a\<^sub>\"
  fixes liftdefl :: "'a itself \ udom u defl"

class predomain = predomain_syn +
  assumes predomain_ep: "ep_pair liftemb liftprj"
  assumes cast_liftdefl: "cast\(liftdefl TYPE('a)) = liftemb oo liftprj"

syntax "_LIFTDEFL" :: "type \ logic"  (‹(1LIFTDEFL/(1'(_')))›)
syntax_consts "_LIFTDEFL" ⇌ liftdefl
translations "LIFTDEFL('t)" ⇌ "CONST liftdefl TYPE('t)"

definition liftdefl_of :: "udom defl \ udom u defl"
  where "liftdefl_of = defl_fun1 ID ID u_map"

lemma cast_liftdefl_of: "cast\(liftdefl_of\t) = u_map\(cast\t)"
by (simp add: liftdefl_of_def cast_defl_fun1 ep_pair_def finite_deflation_u_map)

class "domain" = predomain_syn + pcpo +
  fixes emb :: "'a \ udom"
  fixes prj :: "udom \ 'a"
  fixes defl :: "'a itself \ udom defl"
  assumes ep_pair_emb_prj: "ep_pair emb prj"
  assumes cast_DEFL: "cast\(defl TYPE('a)) = emb oo prj"
  assumes liftemb_eq: "liftemb = u_map\emb"
  assumes liftprj_eq: "liftprj = u_map\prj"
  assumes liftdefl_eq: "liftdefl TYPE('a) = liftdefl_of\(defl TYPE('a))"

syntax "_DEFL" :: "type \ logic"  (‹(1DEFL/(1'(_')))›)
syntax_consts "_DEFL" ⇌ defl
translations "DEFL('t)" ⇌ "CONST defl TYPE('t)"

instance "domain" ⊆ predomain
proof
  show "ep_pair liftemb (liftprj::udom\<^sub>\ \ 'a\<^sub>\)"
    unfolding liftemb_eq liftprj_eq
    by (intro ep_pair_u_map ep_pair_emb_prj)
  show "cast\LIFTDEFL('a) = liftemb oo (liftprj::udom\<^sub>\ \ 'a\<^sub>\)"
    unfolding liftemb_eq liftprj_eq liftdefl_eq
    by (simp add: cast_liftdefl_of cast_DEFL u_map_oo)
qed

text ‹
  Constants 🍋‹liftemb› and 🍋‹liftprj› imply class predomain.
›

setup ‹
  fold Sign.add_const_constraint
  [(🍋‹liftemb›, SOME 🍋‹'a::predomain u \ udom u\),
   (🍋‹liftprj›, SOME 🍋‹udom u → 'a::predomain u\),
   (🍋‹liftdefl›, SOME 🍋‹'a::predomain itself \ udom u defl\)]
›

interpretation predomain: pcpo_ep_pair liftemb liftprj
  unfolding pcpo_ep_pair_def by (rule predomain_ep)

interpretation "domain": pcpo_ep_pair emb prj
  unfolding pcpo_ep_pair_def by (rule ep_pair_emb_prj)

lemmas emb_inverse = domain.e_inverse
lemmas emb_prj_below = domain.e_p_below
lemmas emb_eq_iff = domain.e_eq_iff
lemmas emb_strict = domain.e_strict
lemmas prj_strict = domain.p_strict

subsection ‹Domains are bifinite›

lemma approx_chain_ep_cast:
  assumes ep: "ep_pair (e::'a::pcpo \ 'b::bifinite) (p::'b \ 'a)"
  assumes cast_t: "cast\t = e oo p"
  shows "\(a::nat \ 'a::pcpo \ 'a). approx_chain a"
proof -
  interpret ep_pair e p by fact
  obtain Y where Y: "\i. Y i \ Y (Suc i)"
  and t: "t = (\i. defl_principal (Y i))"
    by (rule defl.obtain_principal_chain)
  define approx where "approx i = (p oo cast\(defl_principal (Y i)) oo e)" for i
  have "approx_chain approx"
  proof (rule approx_chain.intro)
    show "chain (\i. approx i)"
      unfolding approx_def by (simp add: Y)
    show "(\i. approx i) = ID"
      unfolding approx_def
      by (simp add: lub_distribs Y t [symmetric] cast_t cfun_eq_iff)
    show "\i. finite_deflation (approx i)"
      unfolding approx_def
      apply (rule finite_deflation_p_d_e)
      apply (rule finite_deflation_cast)
      apply (rule defl.compact_principal)
      apply (rule below_trans [OF monofun_cfun_fun])
      apply (rule is_ub_thelub, simp add: Y)
      apply (simp add: lub_distribs Y t [symmetric] cast_t)
      done
  qed
  thus "\(a::nat \ 'a \ 'a). approx_chain a" by - (rule exI)
qed

instance "domain" ⊆ bifinite
by standard (rule approx_chain_ep_cast [OF ep_pair_emb_prj cast_DEFL])

instance predomain ⊆ profinite
by standard (rule approx_chain_ep_cast [OF predomain_ep cast_liftdefl])

subsection ‹Universal domain ep-pairs›

definition "u_emb = udom_emb (\i. u_map\(udom_approx i))"
definition "u_prj = udom_prj (\i. u_map\(udom_approx i))"

definition "prod_emb = udom_emb (\i. prod_map\(udom_approx i)\(udom_approx i))"
definition "prod_prj = udom_prj (\i. prod_map\(udom_approx i)\(udom_approx i))"

definition "sprod_emb = udom_emb (\i. sprod_map\(udom_approx i)\(udom_approx i))"
definition "sprod_prj = udom_prj (\i. sprod_map\(udom_approx i)\(udom_approx i))"

definition "ssum_emb = udom_emb (\i. ssum_map\(udom_approx i)\(udom_approx i))"
definition "ssum_prj = udom_prj (\i. ssum_map\(udom_approx i)\(udom_approx i))"

definition "sfun_emb = udom_emb (\i. sfun_map\(udom_approx i)\(udom_approx i))"
definition "sfun_prj = udom_prj (\i. sfun_map\(udom_approx i)\(udom_approx i))"

lemma ep_pair_u: "ep_pair u_emb u_prj"
  unfolding u_emb_def u_prj_def
  by (simp add: ep_pair_udom approx_chain_u_map)

lemma ep_pair_prod: "ep_pair prod_emb prod_prj"
  unfolding prod_emb_def prod_prj_def
  by (simp add: ep_pair_udom approx_chain_prod_map)

lemma ep_pair_sprod: "ep_pair sprod_emb sprod_prj"
  unfolding sprod_emb_def sprod_prj_def
  by (simp add: ep_pair_udom approx_chain_sprod_map)

lemma ep_pair_ssum: "ep_pair ssum_emb ssum_prj"
  unfolding ssum_emb_def ssum_prj_def
  by (simp add: ep_pair_udom approx_chain_ssum_map)

lemma ep_pair_sfun: "ep_pair sfun_emb sfun_prj"
  unfolding sfun_emb_def sfun_prj_def
  by (simp add: ep_pair_udom approx_chain_sfun_map)

subsection ‹Type combinators›

definition u_defl :: "udom defl \ udom defl"
  where "u_defl = defl_fun1 u_emb u_prj u_map"

definition prod_defl :: "udom defl \ udom defl \ udom defl"
  where "prod_defl = defl_fun2 prod_emb prod_prj prod_map"

definition sprod_defl :: "udom defl \ udom defl \ udom defl"
  where "sprod_defl = defl_fun2 sprod_emb sprod_prj sprod_map"

definition ssum_defl :: "udom defl \ udom defl \ udom defl"
where "ssum_defl = defl_fun2 ssum_emb ssum_prj ssum_map"

definition sfun_defl :: "udom defl \ udom defl \ udom defl"
  where "sfun_defl = defl_fun2 sfun_emb sfun_prj sfun_map"

lemma cast_u_defl:
  "cast\(u_defl\A) = u_emb oo u_map\(cast\A) oo u_prj"
using ep_pair_u finite_deflation_u_map
unfolding u_defl_def by (rule cast_defl_fun1)

lemma cast_prod_defl:
  "cast\(prod_defl\A\B) =
    prod_emb oo prod_map⋅(cast⋅A)⋅(cast⋅B) oo prod_prj"
using ep_pair_prod finite_deflation_prod_map
unfolding prod_defl_def by (rule cast_defl_fun2)

lemma cast_sprod_defl:
  "cast\(sprod_defl\A\B) =
    sprod_emb oo sprod_map⋅(cast⋅A)⋅(cast⋅B) oo sprod_prj"
using ep_pair_sprod finite_deflation_sprod_map
unfolding sprod_defl_def by (rule cast_defl_fun2)

lemma cast_ssum_defl:
  "cast\(ssum_defl\A\B) =
    ssum_emb oo ssum_map⋅(cast⋅A)⋅(cast⋅B) oo ssum_prj"
using ep_pair_ssum finite_deflation_ssum_map
unfolding ssum_defl_def by (rule cast_defl_fun2)

lemma cast_sfun_defl:
  "cast\(sfun_defl\A\B) =
    sfun_emb oo sfun_map⋅(cast⋅A)⋅(cast⋅B) oo sfun_prj"
using ep_pair_sfun finite_deflation_sfun_map
unfolding sfun_defl_def by (rule cast_defl_fun2)

text ‹Special deflation combinator for unpointed types.›

definition u_liftdefl :: "udom u defl \ udom defl"
  where "u_liftdefl = defl_fun1 u_emb u_prj ID"

lemma cast_u_liftdefl:
  "cast\(u_liftdefl\A) = u_emb oo cast\A oo u_prj"
unfolding u_liftdefl_def by (simp add: cast_defl_fun1 ep_pair_u)

lemma u_liftdefl_liftdefl_of:
  "u_liftdefl\(liftdefl_of\A) = u_defl\A"
by (rule cast_eq_imp_eq)
   (simp add: cast_u_liftdefl cast_liftdefl_of cast_u_defl)

subsection ‹Class instance proofs›

subsubsection ‹Universal domain›

instantiation udom :: "domain"
begin

definition [simp]:
  "emb = (ID :: udom \ udom)"

definition [simp]:
  "prj = (ID :: udom \ udom)"

definition
  "defl (t::udom itself) = (\i. defl_principal (Abs_fin_defl (udom_approx i)))"

definition
  "(liftemb :: udom u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ udom u) = u_map\prj"

definition
  "liftdefl (t::udom itself) = liftdefl_of\DEFL(udom)"

instance proof
  show "ep_pair emb (prj :: udom \ udom)"
    by (simp add: ep_pair.intro)
  show "cast\DEFL(udom) = emb oo (prj :: udom \ udom)"
    unfolding defl_udom_def
    apply (subst contlub_cfun_arg)
    apply (rule chainI)
    apply (rule defl.principal_mono)
    apply (simp add: below_fin_defl_def)
    apply (simp add: Abs_fin_defl_inverse finite_deflation_udom_approx)
    apply (rule chainE)
    apply (rule chain_udom_approx)
    apply (subst cast_defl_principal)
    apply (simp add: Abs_fin_defl_inverse finite_deflation_udom_approx)
    done
qed (fact liftemb_udom_def liftprj_udom_def liftdefl_udom_def)+

end

subsubsection ‹Lifted cpo›

instantiation u :: (predomain) "domain"
begin

definition
  "emb = u_emb oo liftemb"

definition
  "prj = liftprj oo u_prj"

definition
  "defl (t::'a u itself) = u_liftdefl\LIFTDEFL('a)"

definition
  "(liftemb :: 'a u u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ 'a u u) = u_map\prj"

definition
  "liftdefl (t::'a u itself) = liftdefl_of\DEFL('a u)"

instance proof
  show "ep_pair emb (prj :: udom \ 'a u)"
    unfolding emb_u_def prj_u_def
    by (intro ep_pair_comp ep_pair_u predomain_ep)
  show "cast\DEFL('a u) = emb oo (prj :: udom \ 'a u)"
    unfolding emb_u_def prj_u_def defl_u_def
    by (simp add: cast_u_liftdefl cast_liftdefl assoc_oo)
qed (fact liftemb_u_def liftprj_u_def liftdefl_u_def)+

end

lemma DEFL_u: "DEFL('a::predomain u) = u_liftdefl\LIFTDEFL('a)"
by (rule defl_u_def)

subsubsection ‹Strict function space›

instantiation sfun :: ("domain", "domain") "domain"
begin

definition
  "emb = sfun_emb oo sfun_map\prj\emb"

definition
  "prj = sfun_map\emb\prj oo sfun_prj"

definition
  "defl (t::('a \! 'b) itself) = sfun_defl\DEFL('a)\DEFL('b)"

definition
  "(liftemb :: ('a \! 'b) u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ ('a \! 'b) u) = u_map\prj"

definition
  "liftdefl (t::('a \! 'b) itself) = liftdefl_of\DEFL('a \! 'b)"

instance proof
  show "ep_pair emb (prj :: udom \ 'a \! 'b)"
    unfolding emb_sfun_def prj_sfun_def
    by (intro ep_pair_comp ep_pair_sfun ep_pair_sfun_map ep_pair_emb_prj)
  show "cast\DEFL('a \! 'b) = emb oo (prj :: udom \ 'a \! 'b)"
    unfolding emb_sfun_def prj_sfun_def defl_sfun_def cast_sfun_defl
    by (simp add: cast_DEFL oo_def sfun_eq_iff sfun_map_map)
qed (fact liftemb_sfun_def liftprj_sfun_def liftdefl_sfun_def)+

end

lemma DEFL_sfun:
  "DEFL('a::domain \! 'b::domain) = sfun_defl\DEFL('a)\DEFL('b)"
by (rule defl_sfun_def)

subsubsection ‹Continuous function space›

instantiation cfun :: (predomain, "domain") "domain"
begin

definition
  "emb = emb oo encode_cfun"

definition
  "prj = decode_cfun oo prj"

definition
  "defl (t::('a \ 'b) itself) = DEFL('a u \! 'b)"

definition
  "(liftemb :: ('a \ 'b) u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ ('a \ 'b) u) = u_map\prj"

definition
  "liftdefl (t::('a \ 'b) itself) = liftdefl_of\DEFL('a \ 'b)"

instance proof
  have "ep_pair encode_cfun decode_cfun"
    by (rule ep_pair.intro, simp_all)
  thus "ep_pair emb (prj :: udom \ 'a \ 'b)"
    unfolding emb_cfun_def prj_cfun_def
    using ep_pair_emb_prj by (rule ep_pair_comp)
  show "cast\DEFL('a \ 'b) = emb oo (prj :: udom \ 'a \ 'b)"
    unfolding emb_cfun_def prj_cfun_def defl_cfun_def
    by (simp add: cast_DEFL cfcomp1)
qed (fact liftemb_cfun_def liftprj_cfun_def liftdefl_cfun_def)+

end

lemma DEFL_cfun:
  "DEFL('a::predomain \ 'b::domain) = DEFL('a u \! 'b)"
by (rule defl_cfun_def)

subsubsection ‹Strict product›

instantiation sprod :: ("domain", "domain") "domain"
begin

definition
  "emb = sprod_emb oo sprod_map\emb\emb"

definition
  "prj = sprod_map\prj\prj oo sprod_prj"

definition
  "defl (t::('a \ 'b) itself) = sprod_defl\DEFL('a)\DEFL('b)"

definition
  "(liftemb :: ('a \ 'b) u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ ('a \ 'b) u) = u_map\prj"

definition
  "liftdefl (t::('a \ 'b) itself) = liftdefl_of\DEFL('a \ 'b)"

instance proof
  show "ep_pair emb (prj :: udom \ 'a \ 'b)"
    unfolding emb_sprod_def prj_sprod_def
    by (intro ep_pair_comp ep_pair_sprod ep_pair_sprod_map ep_pair_emb_prj)
  show "cast\DEFL('a \ 'b) = emb oo (prj :: udom \ 'a \ 'b)"
    unfolding emb_sprod_def prj_sprod_def defl_sprod_def cast_sprod_defl
    by (simp add: cast_DEFL oo_def cfun_eq_iff sprod_map_map)
qed (fact liftemb_sprod_def liftprj_sprod_def liftdefl_sprod_def)+

end

lemma DEFL_sprod:
  "DEFL('a::domain \ 'b::domain) = sprod_defl\DEFL('a)\DEFL('b)"
by (rule defl_sprod_def)

subsubsection ‹Cartesian product›

definition prod_liftdefl :: "udom u defl \ udom u defl \ udom u defl"
  where "prod_liftdefl = defl_fun2 (u_map\prod_emb oo decode_prod_u)
    (encode_prod_u oo u_map⋅prod_prj) sprod_map"

lemma cast_prod_liftdefl:
  "cast\(prod_liftdefl\a\b) =
    (u_map⋅prod_emb oo decode_prod_u) oo sprod_map⋅(cast⋅a)⋅(cast⋅b) oo
      (encode_prod_u oo u_map⋅prod_prj)"
unfolding prod_liftdefl_def
apply (rule cast_defl_fun2)
apply (intro ep_pair_comp ep_pair_u_map ep_pair_prod)
apply (simp add: ep_pair.intro)
apply (erule (1) finite_deflation_sprod_map)
done

instantiation prod :: (predomain, predomain) predomain
begin

definition
  "liftemb = (u_map\prod_emb oo decode_prod_u) oo
    (sprod_map⋅liftemb⋅liftemb oo encode_prod_u)"

definition
  "liftprj = (decode_prod_u oo sprod_map\liftprj\liftprj) oo
    (encode_prod_u oo u_map⋅prod_prj)"

definition
  "liftdefl (t::('a \ 'b) itself) = prod_liftdefl\LIFTDEFL('a)\LIFTDEFL('b)"

instance proof
  show "ep_pair liftemb (liftprj :: udom u \ ('a \ 'b) u)"
    unfolding liftemb_prod_def liftprj_prod_def
    by (intro ep_pair_comp ep_pair_sprod_map ep_pair_u_map
       ep_pair_prod predomain_ep, simp_all add: ep_pair.intro)
  show "cast\LIFTDEFL('a \ 'b) = liftemb oo (liftprj :: udom u \ ('a \ 'b) u)"
    unfolding liftemb_prod_def liftprj_prod_def liftdefl_prod_def
    by (simp add: cast_prod_liftdefl cast_liftdefl cfcomp1 sprod_map_map)
qed

end

instantiation prod :: ("domain", "domain") "domain"
begin

definition
  "emb = prod_emb oo prod_map\emb\emb"

definition
  "prj = prod_map\prj\prj oo prod_prj"

definition
  "defl (t::('a \ 'b) itself) = prod_defl\DEFL('a)\DEFL('b)"

instance proof
  show 1: "ep_pair emb (prj :: udom \ 'a \ 'b)"
    unfolding emb_prod_def prj_prod_def
    by (intro ep_pair_comp ep_pair_prod ep_pair_prod_map ep_pair_emb_prj)
  show 2: "cast\DEFL('a \ 'b) = emb oo (prj :: udom \ 'a \ 'b)"
    unfolding emb_prod_def prj_prod_def defl_prod_def cast_prod_defl
    by (simp add: cast_DEFL oo_def cfun_eq_iff prod_map_map)
  show 3: "liftemb = u_map\(emb :: 'a \ 'b \ udom)"
    unfolding emb_prod_def liftemb_prod_def liftemb_eq
    unfolding encode_prod_u_def decode_prod_u_def
    by (rule cfun_eqI, case_tac x, simp, clarsimp)
  show 4: "liftprj = u_map\(prj :: udom \ 'a \ 'b)"
    unfolding prj_prod_def liftprj_prod_def liftprj_eq
    unfolding encode_prod_u_def decode_prod_u_def
    apply (rule cfun_eqI, case_tac x, simp)
    apply (rename_tac y, case_tac "prod_prj\y", simp)
    done
  show 5: "LIFTDEFL('a \ 'b) = liftdefl_of\DEFL('a \ 'b)"
    by (rule cast_eq_imp_eq)
      (simp add: cast_liftdefl cast_liftdefl_of cast_DEFL 2 3 4 u_map_oo)
qed

end

lemma DEFL_prod:
  "DEFL('a::domain \ 'b::domain) = prod_defl\DEFL('a)\DEFL('b)"
by (rule defl_prod_def)

lemma LIFTDEFL_prod:
  "LIFTDEFL('a::predomain \ 'b::predomain) =
    prod_liftdefl⋅LIFTDEFL('a)\LIFTDEFL('b)"
by (rule liftdefl_prod_def)

subsubsection ‹Unit type›

instantiation unit :: "domain"
begin

definition
  "emb = (\ :: unit \ udom)"

definition
  "prj = (\ :: udom \ unit)"

definition
  "defl (t::unit itself) = \"

definition
  "(liftemb :: unit u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ unit u) = u_map\prj"

definition
  "liftdefl (t::unit itself) = liftdefl_of\DEFL(unit)"

instance proof
  show "ep_pair emb (prj :: udom \ unit)"
    unfolding emb_unit_def prj_unit_def
    by (simp add: ep_pair.intro)
  show "cast\DEFL(unit) = emb oo (prj :: udom \ unit)"
    unfolding emb_unit_def prj_unit_def defl_unit_def by simp
qed (fact liftemb_unit_def liftprj_unit_def liftdefl_unit_def)+

end

subsubsection ‹Discrete cpo›

instantiation discr :: (countable) predomain
begin

definition
  "(liftemb :: 'a discr u \ udom u) = strictify\up oo udom_emb discr_approx"

definition
  "(liftprj :: udom u \ 'a discr u) = udom_prj discr_approx oo fup\ID"

definition
  "liftdefl (t::'a discr itself) =
    (⊔i. defl_principal (Abs_fin_defl (liftemb oo discr_approx i oo (liftprj::udom u → 'a discr u))))"

instance proof
  show 1: "ep_pair liftemb (liftprj :: udom u \ 'a discr u)"
    unfolding liftemb_discr_def liftprj_discr_def
    apply (intro ep_pair_comp ep_pair_udom [OF discr_approx])
    apply (rule ep_pair.intro)
    apply (simp add: strictify_conv_if)
    apply (case_tac y, simp, simp add: strictify_conv_if)
    done
  show "cast\LIFTDEFL('a discr) = liftemb oo (liftprj :: udom u \ 'a discr u)"
    unfolding liftdefl_discr_def
    apply (subst contlub_cfun_arg)
    apply (rule chainI)
    apply (rule defl.principal_mono)
    apply (simp add: below_fin_defl_def)
    apply (simp add: Abs_fin_defl_inverse
        ep_pair.finite_deflation_e_d_p [OF 1]
        approx_chain.finite_deflation_approx [OF discr_approx])
    apply (intro monofun_cfun below_refl)
    apply (rule chainE)
    apply (rule chain_discr_approx)
    apply (subst cast_defl_principal)
    apply (simp add: Abs_fin_defl_inverse
        ep_pair.finite_deflation_e_d_p [OF 1]
        approx_chain.finite_deflation_approx [OF discr_approx])
    apply (simp add: lub_distribs)
    done
qed

end

subsubsection ‹Strict sum›

instantiation ssum :: ("domain", "domain") "domain"
begin

definition
  "emb = ssum_emb oo ssum_map\emb\emb"

definition
  "prj = ssum_map\prj\prj oo ssum_prj"

definition
  "defl (t::('a \ 'b) itself) = ssum_defl\DEFL('a)\DEFL('b)"

definition
  "(liftemb :: ('a \ 'b) u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ ('a \ 'b) u) = u_map\prj"

definition
  "liftdefl (t::('a \ 'b) itself) = liftdefl_of\DEFL('a \ 'b)"

instance proof
  show "ep_pair emb (prj :: udom \ 'a \ 'b)"
    unfolding emb_ssum_def prj_ssum_def
    by (intro ep_pair_comp ep_pair_ssum ep_pair_ssum_map ep_pair_emb_prj)
  show "cast\DEFL('a \ 'b) = emb oo (prj :: udom \ 'a \ 'b)"
    unfolding emb_ssum_def prj_ssum_def defl_ssum_def cast_ssum_defl
    by (simp add: cast_DEFL oo_def cfun_eq_iff ssum_map_map)
qed (fact liftemb_ssum_def liftprj_ssum_def liftdefl_ssum_def)+

end

lemma DEFL_ssum:
  "DEFL('a::domain \ 'b::domain) = ssum_defl\DEFL('a)\DEFL('b)"
by (rule defl_ssum_def)

subsubsection ‹Lifted HOL type›

instantiation lift :: (countable) "domain"
begin

definition
  "emb = emb oo (\ x. Rep_lift x)"

definition
  "prj = (\ y. Abs_lift y) oo prj"

definition
  "defl (t::'a lift itself) = DEFL('a discr u)"

definition
  "(liftemb :: 'a lift u \ udom u) = u_map\emb"

definition
  "(liftprj :: udom u \ 'a lift u) = u_map\prj"

definition
  "liftdefl (t::'a lift itself) = liftdefl_of\DEFL('a lift)"

instance proof
  note [simp] = cont_Rep_lift cont_Abs_lift Rep_lift_inverse Abs_lift_inverse
  have "ep_pair (\(x::'a lift). Rep_lift x) (\ y. Abs_lift y)"
    by (simp add: ep_pair_def)
  thus "ep_pair emb (prj :: udom \ 'a lift)"
    unfolding emb_lift_def prj_lift_def
    using ep_pair_emb_prj by (rule ep_pair_comp)
  show "cast\DEFL('a lift) = emb oo (prj :: udom \ 'a lift)"
    unfolding emb_lift_def prj_lift_def defl_lift_def cast_DEFL
    by (simp add: cfcomp1)
qed (fact liftemb_lift_def liftprj_lift_def liftdefl_lift_def)+

end

end

Messung V0.5

¤ Dauer der Verarbeitung: 0.10 Sekunden ¤

Wurzel

Suchen

Beweissystem der NASA

Beweissystem Isabelle

NIST Cobol Testsuite

Cephes Mathematical Library

Wiener Entwicklungsmethode

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