(*********************************************************************************************************************************)
(* ProgrammingLanguage *)
(* *)
-(* Basic assumptions about programming languages . *)
+(* Basic assumptions about programming languages. *)
(* *)
(*********************************************************************************************************************************)
Require Import FreydCategories.
Require Import Reification.
-Require Import GeneralizedArrow.
+Require Import GeneralizedArrows.
Require Import GeneralizedArrowFromReification.
-Require Import ReificationFromGeneralizedArrow.
-
-(*
- * Everything in the rest of this section is just groundwork meant to
- * build up to the definition of the ProgrammingLanguage class, which
- * appears at the end of the section. References to "the instance"
- * mean instances of that class. Think of this section as being one
- * big Class { ... } definition, except that we declare most of the
- * stuff outside the curly brackets in order to take advantage of
- * Coq's section mechanism.
- *)
+
Section Programming_Language.
Context {T : Type}. (* types of the language *)
Context (Judg : Type).
Context (sequent : Tree ??T -> Tree ??T -> Judg).
- Notation "cs |= ss" := (sequent cs ss) : al_scope.
- (* Because of term irrelevance we need only store the *erased* (def
- * 4.4) trees; for this reason there is no Coq type directly
- * corresponding to productions $e$ and $x$ of 4.1.1, and TreeOT can
- * be used for productions $\Gamma$ and $\Sigma$ *)
-
- (* to do: sequent calculus equals natural deduction over sequents, theorem equals sequent with null antecedent, *)
+ Notation "cs |= ss" := (sequent cs ss) : pl_scope.
Context {Rule : Tree ??Judg -> Tree ??Judg -> Type}.
- Notation "H /⋯⋯/ C" := (ND Rule H C) : al_scope.
+ Notation "H /⋯⋯/ C" := (ND Rule H C) : pl_scope.
Open Scope pf_scope.
Open Scope nd_scope.
- Open Scope al_scope.
-
- (*
- *
- * Note that from this abstract interface, the terms (expressions)
- * in the proof are not accessible at all; they don't need to be --
- * so long as we have access to the equivalence relation upon
- * proof-conclusions. Moreover, hiding the expressions actually
- * makes the encoding in CiC work out easier for two reasons:
- *
- * 1. Because the denotation function is provided a proof rather
- * than a term, it is a total function (the denotation function is
- * often undefined for ill-typed terms).
- *
- * 2. We can define arr_composition of proofs without having to know how
- * to compose expressions. The latter task is left up to the client
- * function which extracts an expression from a completed proof.
- *
- * This also means that we don't need an explicit proof obligation for 4.1.2.
- *)
+ Open Scope pl_scope.
+
Class ProgrammingLanguage :=
- { al_eqv : @ND_Relation Judg Rule where "pf1 === pf2" := (@ndr_eqv _ _ al_eqv _ _ pf1 pf2)
- ; al_tsr : TreeStructuralRules
- ; al_subst : CutRule
- ; al_sequent_join : SequentJoin
+ { pl_eqv : @ND_Relation Judg Rule where "pf1 === pf2" := (@ndr_eqv _ _ pl_eqv _ _ pf1 pf2)
+ ; pl_tsr :> @TreeStructuralRules Judg Rule T sequent
+ ; pl_sc :> @SequentCalculus Judg Rule _ sequent
+ ; pl_subst :> @CutRule Judg Rule _ sequent pl_eqv pl_sc
+ ; pl_sequent_join :> @SequentExpansion Judg Rule T sequent pl_eqv pl_sc pl_subst
}.
- Notation "pf1 === pf2" := (@ndr_eqv _ _ al_eqv _ _ pf1 pf2) : temporary_scope3.
+ Notation "pf1 === pf2" := (@ndr_eqv _ _ pl_eqv _ _ pf1 pf2) : temporary_scope3.
Section LanguageCategory.
Context (PL:ProgrammingLanguage).
(* category of judgments in a fixed type/coercion context *)
- Definition Judgments_cartesian := @Judgments_Category_CartesianCat _ Rule al_eqv.
+ Definition Judgments_cartesian := @Judgments_Category_CartesianCat _ Rule pl_eqv.
Definition JudgmentsL := Judgments_cartesian.
Definition identityProof t : [] ~~{JudgmentsL}~~> [t |= t].
unfold hom; simpl.
- apply nd_rule.
- apply al_reflexive_seq.
+ apply nd_seq_reflexive.
Defined.
Definition cutProof a b c : [a |= b],,[b |= c] ~~{JudgmentsL}~~> [a |= c].
unfold hom; simpl.
- apply al_subst.
+ apply pl_subst.
Defined.
Definition TypesL : ECategory JudgmentsL (Tree ??T) (fun x y => [x|=y]).
apply MonoidalCat_all_central.
apply MonoidalCat_all_central.
unfold identityProof; unfold cutProof; simpl.
- apply al_subst_left_identity.
+ apply nd_cut_left_identity.
unfold identityProof; unfold cutProof; simpl.
- apply al_subst_right_identity.
+ apply nd_cut_right_identity.
unfold identityProof; unfold cutProof; simpl.
- apply al_subst_associativity'.
+ symmetry.
+ apply nd_cut_associativity.
Defined.
Definition Types_first c : EFunctor TypesL TypesL (fun x => x,,c ).
- (*
- eapply Build_EFunctor; intros.
- eapply MonoidalCat_all_central.
- unfold eqv.
- simpl.
- *)
- admit.
+ refine {| efunc := fun x y => (@se_expand_right _ _ _ _ _ _ _ (@pl_sequent_join PL) c x y) |}.
+ intros; apply MonoidalCat_all_central.
+ intros. unfold ehom. unfold hom. unfold identityProof. unfold eid. simpl. unfold identityProof.
+ apply se_reflexive_right.
+ intros. unfold ehom. unfold comp. simpl. unfold cutProof.
+ rewrite <- (@ndr_prod_preserves_comp _ _ pl_eqv _ _ (se_expand_right _ c) _ _ (nd_id1 (b|=c0))
+ _ (nd_id1 (a,,c |= b,,c)) _ (se_expand_right _ c)).
+ setoid_rewrite (@ndr_comp_right_identity _ _ pl_eqv _ [a,, c |= b,, c]).
+ setoid_rewrite (@ndr_comp_left_identity _ _ pl_eqv [b |= c0]).
+ apply se_cut_right.
Defined.
- Definition Types_second c : EFunctor TypesL TypesL (fun x => c,,x ).
- admit.
+ Definition Types_second c : EFunctor TypesL TypesL (fun x => c,,x).
+ eapply Build_EFunctor.
+ instantiate (1:=(fun x y => ((@se_expand_left _ _ _ _ _ _ _ (@pl_sequent_join PL) c x y)))).
+ intros; apply MonoidalCat_all_central.
+ intros. unfold ehom. unfold hom. unfold identityProof. unfold eid. simpl. unfold identityProof.
+ apply se_reflexive_left.
+ intros. unfold ehom. unfold comp. simpl. unfold cutProof.
+ rewrite <- (@ndr_prod_preserves_comp _ _ pl_eqv _ _ (se_expand_left _ c) _ _ (nd_id1 (b|=c0))
+ _ (nd_id1 (c,,a |= c,,b)) _ (se_expand_left _ c)).
+ setoid_rewrite (@ndr_comp_right_identity _ _ pl_eqv _ [c,,a |= c,,b]).
+ setoid_rewrite (@ndr_comp_left_identity _ _ pl_eqv [b |= c0]).
+ apply se_cut_left.
Defined.
Definition Types_binoidal : BinoidalCat TypesL (@T_Branch _).
|}.
Defined.
- Definition TypesL_binoidal : BinoidalCat TypesL (@T_Branch _).
- admit.
- Defined.
+ Definition Types_assoc a b : Types_second a >>>> Types_first b <~~~> Types_first b >>>> Types_second a.
+ admit.
+ Defined.
+
+ Definition Types_cancelr : Types_first [] <~~~> functor_id _.
+ admit.
+ Defined.
+
+ Definition Types_cancell : Types_second [] <~~~> functor_id _.
+ admit.
+ Defined.
+
+ Definition Types_assoc_ll a b : Types_second (a,,b) <~~~> Types_second b >>>> Types_second a.
+ admit.
+ Defined.
+
+ Definition Types_assoc_rr a b : Types_first (a,,b) <~~~> Types_first a >>>> Types_first b.
+ admit.
+ Defined.
- Definition Types_PreMonoidal : PreMonoidalCat TypesL_binoidal [].
- admit.
- Defined.
+ Instance Types_PreMonoidal : PreMonoidalCat Types_binoidal [] :=
+ { pmon_assoc := Types_assoc
+ ; pmon_cancell := Types_cancell
+ ; pmon_cancelr := Types_cancelr
+ ; pmon_assoc_rr := Types_assoc_rr
+ ; pmon_assoc_ll := Types_assoc_ll
+ }.
+ admit. (* pentagon law *)
+ admit. (* triangle law *)
+ admit. (* assoc_rr/assoc coherence *)
+ admit. (* assoc_ll/assoc coherence *)
+ Defined.
Definition TypesEnrichedInJudgments : Enrichment.
refine {| enr_c := TypesL |}.
Defined.
End LanguageCategory.
+End Programming_Language.
- Structure ProgrammingLanguageSMME :=
- { plsmme_pl : ProgrammingLanguage
- ; plsmme_smme : SurjectiveMonicMonoidalEnrichment (TypesEnrichedInJudgments plsmme_pl)
- }.
- Coercion plsmme_pl : ProgrammingLanguageSMME >-> ProgrammingLanguage.
- Coercion plsmme_smme : ProgrammingLanguageSMME >-> SurjectiveMonicMonoidalEnrichment.
-
- Section ArrowInLanguage.
- Context (Host:ProgrammingLanguageSMME).
- Context `(CC:CartesianCat (me_mon Host)).
- Context `(K:@ECategory _ _ _ _ _ _ (@car_mn _ _ _ _ _ _ _ CC) C Kehom).
- Context `(pmc:PreMonoidalCat K bobj mobj (@one _ _ _ (cartesian_terminal C))).
- (* FIXME *)
- (*
- Definition ArrowInProgrammingLanguage :=
- @FreydCategory _ _ _ _ _ _ (@car_mn _ _ _ _ _ _ _ CC) _ _ _ _ pmc.
- *)
- End ArrowInLanguage.
-
- Section GArrowInLanguage.
- Context (Guest:ProgrammingLanguageSMME).
- Context (Host :ProgrammingLanguageSMME).
- Definition GeneralizedArrowInLanguage := GeneralizedArrow Guest Host.
-
- (* FIXME
- Definition ArrowsAreGeneralizedArrows : ArrowInProgrammingLanguage -> GeneralizedArrowInLanguage.
- *)
- Definition TwoLevelLanguage := Reification Guest Host (me_i Host).
-
- Context (GuestHost:TwoLevelLanguage).
-
- Definition FlatObject (x:TypesL Host) :=
- forall y1 y2, not ((reification_r_obj GuestHost y1 y2)=x).
-
- Definition FlatSubCategory := FullSubcategory (TypesL Host) FlatObject.
-
- Section Flattening.
-
- Context (F:Retraction (TypesL Host) FlatSubCategory).
- Definition FlatteningOfReification := garrow_from_reification Guest Host GuestHost >>>> F.
- Lemma FlatteningIsNotDestructive :
- FlatteningOfReification >>>> retraction_retraction F >>>> RepresentableFunctor _ (me_i Host) ~~~~ GuestHost.
- admit.
- Qed.
-
- End Flattening.
-
- End GArrowInLanguage.
-
- Inductive NLevelLanguage : nat -> ProgrammingLanguageSMME -> Type :=
- | NLevelLanguage_zero : forall lang, NLevelLanguage O lang
- | NLevelLanguage_succ : forall (L1 L2:ProgrammingLanguageSMME) n,
- TwoLevelLanguage L1 L2 -> NLevelLanguage n L1 -> NLevelLanguage (S n) L2.
-
- Definition OmegaLevelLanguage : Type :=
- { f : nat -> ProgrammingLanguageSMME
- & forall n, TwoLevelLanguage (f n) (f (S n)) }.
-
- Close Scope temporary_scope3.
- Close Scope al_scope.
- Close Scope nd_scope.
- Close Scope pf_scope.
+Structure ProgrammingLanguageSMME :=
+{ plsmme_t : Type
+; plsmme_judg : Type
+; plsmme_sequent : Tree ??plsmme_t -> Tree ??plsmme_t -> plsmme_judg
+; plsmme_rule : Tree ??plsmme_judg -> Tree ??plsmme_judg -> Type
+; plsmme_pl : @ProgrammingLanguage plsmme_t plsmme_judg plsmme_sequent plsmme_rule
+; plsmme_smme : SurjectiveMonicMonoidalEnrichment (TypesEnrichedInJudgments _ _ plsmme_pl)
+}.
+Coercion plsmme_pl : ProgrammingLanguageSMME >-> ProgrammingLanguage.
+Coercion plsmme_smme : ProgrammingLanguageSMME >-> SurjectiveMonicMonoidalEnrichment.
+
+Section ArrowInLanguage.
+ Context (Host:ProgrammingLanguageSMME).
+ Context `(CC:CartesianCat (me_mon Host)).
+ Context `(K:@ECategory _ _ _ _ _ _ (@car_mn _ _ _ _ _ _ _ CC) C Kehom).
+ Context `(pmc:PreMonoidalCat K bobj mobj (@one _ _ _ (cartesian_terminal C))).
+ (* FIXME *)
+ (*
+ Definition ArrowInProgrammingLanguage :=
+ @FreydCategory _ _ _ _ _ _ (@car_mn _ _ _ _ _ _ _ CC) _ _ _ _ pmc.
+ *)
+End ArrowInLanguage.
-End Programming_Language.
+Section GArrowInLanguage.
+ Context (Guest:ProgrammingLanguageSMME).
+ Context (Host :ProgrammingLanguageSMME).
+ Definition GeneralizedArrowInLanguage := GeneralizedArrow Guest Host.
+
+ (* FIXME
+ Definition ArrowsAreGeneralizedArrows : ArrowInProgrammingLanguage -> GeneralizedArrowInLanguage.
+ *)
+ Definition TwoLevelLanguage := Reification Guest Host (me_i Host).
+
+ Context (GuestHost:TwoLevelLanguage).
+
+ Definition FlatObject (x:TypesL _ _ Host) :=
+ forall y1 y2, not ((reification_r_obj GuestHost y1 y2)=x).
+
+ Definition FlatSubCategory := FullSubcategory (TypesL _ _ Host) FlatObject.
+
+ Section Flattening.
+
+ Context (F:Retraction (TypesL _ _ Host) FlatSubCategory).
+ Definition FlatteningOfReification := garrow_from_reification Guest Host GuestHost >>>> F.
+ Lemma FlatteningIsNotDestructive :
+ FlatteningOfReification >>>> retraction_retraction F >>>> RepresentableFunctor _ (me_i Host) ~~~~ GuestHost.
+ admit.
+ Qed.
+
+ End Flattening.
+
+End GArrowInLanguage.
+
+Inductive NLevelLanguage : nat -> ProgrammingLanguageSMME -> Type :=
+| NLevelLanguage_zero : forall lang, NLevelLanguage O lang
+| NLevelLanguage_succ : forall (L1 L2:ProgrammingLanguageSMME) n,
+ TwoLevelLanguage L1 L2 -> NLevelLanguage n L1 -> NLevelLanguage (S n) L2.
+Definition OmegaLevelLanguage : Type :=
+ { f : nat -> ProgrammingLanguageSMME
+ & forall n, TwoLevelLanguage (f n) (f (S n)) }.
+
Implicit Arguments ND [ Judgment ].