Require Import Categories_ch1_3.
Require Import Functors_ch1_4.
Require Import Isomorphisms_ch1_5.
-Require Import ProductCategories_ch1_6_1.
Require Import InitialTerminal_ch2_2.
Require Import Subcategories_ch7_1.
Require Import NaturalTransformations_ch7_4.
(* not in Awodey *)
Class PreMonoidalCat `(bc:BinoidalCat(C:=C))(I:C) :=
-{ pmon_I := I
-; pmon_bin := bc
-; pmon_cat := C
-; pmon_assoc : forall a b, (bin_second a >>>> bin_first b) <~~~> (bin_first b >>>> bin_second a)
-; pmon_cancelr : (bin_first I) <~~~> functor_id C
-; pmon_cancell : (bin_second I) <~~~> functor_id C
-; pmon_pentagon : Pentagon (fun a b c f => f ⋉ c) (fun a b c f => c ⋊ f) (fun a b c => #((pmon_assoc a c) b))
-; pmon_triangle : Triangle (fun a b c f => f ⋉ c) (fun a b c f => c ⋊ f) (fun a b c => #((pmon_assoc a c) b))
- (fun a => #(pmon_cancell a)) (fun a => #(pmon_cancelr a))
-; pmon_assoc_rr : forall a b, (bin_first (a⊗b)) <~~~> (bin_first a >>>> bin_first b)
-; pmon_assoc_ll : forall a b, (bin_second (a⊗b)) <~~~> (bin_second b >>>> bin_second a)
-; pmon_coherent_r : forall a c d:C, #(pmon_assoc_rr c d a) ~~ #(pmon_assoc a d c)⁻¹
-; pmon_coherent_l : forall a c d:C, #(pmon_assoc_ll c a d) ~~ #(pmon_assoc c d a)
+{ pmon_I := I
+; pmon_bin := bc
+; pmon_cat := C
+; pmon_assoc : forall a b, (bin_second a >>>> bin_first b) <~~~> (bin_first b >>>> bin_second a)
+; pmon_cancelr : (bin_first I) <~~~> functor_id C
+; pmon_cancell : (bin_second I) <~~~> functor_id C
+; pmon_pentagon : Pentagon (fun a b c f => f ⋉ c) (fun a b c f => c ⋊ f) (fun a b c => #((pmon_assoc a c) b))
+; pmon_triangle : Triangle (fun a b c f => f ⋉ c) (fun a b c f => c ⋊ f) (fun a b c => #((pmon_assoc a c) b))
+ (fun a => #(pmon_cancell a)) (fun a => #(pmon_cancelr a))
+; pmon_assoc_rr : forall a b, (bin_first (a⊗b)) <~~~> (bin_first a >>>> bin_first b)
+; pmon_assoc_ll : forall a b, (bin_second (a⊗b)) <~~~> (bin_second b >>>> bin_second a)
+; pmon_coherent_r : forall a c d:C, #(pmon_assoc_rr c d a) ~~ #(pmon_assoc a d c)⁻¹
+; pmon_coherent_l : forall a c d:C, #(pmon_assoc_ll c a d) ~~ #(pmon_assoc c d a)
+; pmon_assoc_central : forall a b c, CentralMorphism #(pmon_assoc a b c)
+; pmon_cancelr_central : forall a , CentralMorphism #(pmon_cancelr a)
+; pmon_cancell_central : forall a , CentralMorphism #(pmon_cancell a)
}.
(*
* Premonoidal categories actually have three associators (the "f"
* might need extra versions of the triangle/pentagon diagrams.
*)
-Implicit Arguments pmon_cancell [ Ob Hom C bin_obj' bc I ].
-Implicit Arguments pmon_cancelr [ Ob Hom C bin_obj' bc I ].
-Implicit Arguments pmon_assoc [ Ob Hom C bin_obj' bc I ].
+Implicit Arguments pmon_cancell [ Ob Hom C bin_obj' bc I PreMonoidalCat ].
+Implicit Arguments pmon_cancelr [ Ob Hom C bin_obj' bc I PreMonoidalCat ].
+Implicit Arguments pmon_assoc [ Ob Hom C bin_obj' bc I PreMonoidalCat ].
Coercion pmon_bin : PreMonoidalCat >-> BinoidalCat.
(* this turns out to be Exercise VII.1.1 from Mac Lane's CWM *)
Lemma MacLane_ex_VII_1_1 `{mn:PreMonoidalCat(I:=EI)} a b
- : #((pmon_cancelr mn) (a ⊗ b)) ~~ #((pmon_assoc mn a EI) b) >>> (a ⋊-) \ #((pmon_cancelr mn) b).
+ : #(pmon_cancelr (a ⊗ b)) ~~ #((pmon_assoc a EI) b) >>> (a ⋊-) \ #(pmon_cancelr b).
set (pmon_pentagon EI EI a b) as penta. unfold pmon_pentagon in penta.
set (pmon_triangle a b) as tria. unfold pmon_triangle in tria.
apply (fmor_respects(bin_second EI)) in tria.
set (@fmor_preserves_comp) as fpc.
setoid_rewrite <- fpc in tria.
- set (ni_commutes (pmon_assoc mn a b)) as xx.
+ set (ni_commutes (pmon_assoc a b)) as xx.
(* FIXME *)
Admitted.
`(PM1:PreMonoidalCat(C:=C1)(I:=I1))
`(PM2:PreMonoidalCat(C:=C2)(I:=I2))
(fobj : C1 -> C2 ) :=
-{ mf_F :> Functor C1 C2 fobj
-; mf_preserves_i : mf_F I1 ≅ I2
-; mf_preserves_first : forall a, bin_first a >>>> mf_F <~~~> mf_F >>>> bin_first (mf_F a)
-; mf_preserves_second : forall a, bin_second a >>>> mf_F <~~~> mf_F >>>> bin_second (mf_F a)
-; mf_preserves_center : forall `(f:a~>b), CentralMorphism f -> CentralMorphism (mf_F \ f)
+{ mf_F :> Functor C1 C2 fobj
+; mf_i : I2 ≅ mf_F I1
+; mf_first : ∀ a, mf_F >>>> bin_first (mf_F a) <~~~> bin_first a >>>> mf_F
+; mf_second : ∀ a, mf_F >>>> bin_second (mf_F a) <~~~> bin_second a >>>> mf_F
+; mf_consistent : ∀ a b, #(mf_first a b) ~~ #(mf_second b a)
+; mf_center : forall `(f:a~>b), CentralMorphism f -> CentralMorphism (mf_F \ f)
+; mf_cancell : ∀ b, #(pmon_cancell _) ~~ #mf_i ⋉ _ >>> #(mf_first b I1) >>> mf_F \ #(pmon_cancell b)
+; mf_cancelr : ∀ a, #(pmon_cancelr _) ~~ _ ⋊ #mf_i >>> #(mf_second a I1) >>> mf_F \ #(pmon_cancelr a)
+; mf_assoc : ∀ a b c, #(pmon_assoc _ _ _) >>> _ ⋊ #(mf_second _ _) >>> #(mf_second _ _) ~~
+ #(mf_second _ _) ⋉ _ >>> #(mf_second _ _) >>> mf_F \ #(pmon_assoc a c b)
}.
Coercion mf_F : PreMonoidalFunctor >-> Functor.
+Definition PreMonoidalFunctorsCompose
+ `{PM1 :PreMonoidalCat(C:=C1)(I:=I1)}
+ `{PM2 :PreMonoidalCat(C:=C2)(I:=I2)}
+ {fobj12:C1 -> C2 }
+ (PMF12 :PreMonoidalFunctor PM1 PM2 fobj12)
+ `{PM3 :PreMonoidalCat(C:=C3)(I:=I3)}
+ {fobj23:C2 -> C3 }
+ (PMF23 :PreMonoidalFunctor PM2 PM3 fobj23)
+ : PreMonoidalFunctor PM1 PM3 (fobj23 ○ fobj12).
+ admit.
+ Defined.
+
(*******************************************************************************)
(* Braided and Symmetric Categories *)
Class BraidedCat `(mc:PreMonoidalCat) :=
{ br_niso : forall a, bin_first a <~~~> bin_second a
; br_swap := fun a b => ni_iso (br_niso b) a
-; triangleb : forall a:C, #(pmon_cancelr mc a) ~~ #(br_swap a (pmon_I(PreMonoidalCat:=mc))) >>> #(pmon_cancell mc a)
-; hexagon1 : forall {a b c}, #(pmon_assoc mc _ _ _) >>> #(br_swap a _) >>> #(pmon_assoc mc _ _ _)
- ~~ #(br_swap _ _) ⋉ c >>> #(pmon_assoc mc _ _ _) >>> b ⋊ #(br_swap _ _)
-; hexagon2 : forall {a b c}, #(pmon_assoc mc _ _ _)⁻¹ >>> #(br_swap _ c) >>> #(pmon_assoc mc _ _ _)⁻¹
- ~~ a ⋊ #(br_swap _ _) >>> #(pmon_assoc mc _ _ _)⁻¹ >>> #(br_swap _ _) ⋉ b
+; triangleb : forall a:C, #(pmon_cancelr a) ~~ #(br_swap a (pmon_I(PreMonoidalCat:=mc))) >>> #(pmon_cancell a)
+; hexagon1 : forall {a b c}, #(pmon_assoc _ _ _) >>> #(br_swap a _) >>> #(pmon_assoc _ _ _)
+ ~~ #(br_swap _ _) ⋉ c >>> #(pmon_assoc _ _ _) >>> b ⋊ #(br_swap _ _)
+; hexagon2 : forall {a b c}, #(pmon_assoc _ _ _)⁻¹ >>> #(br_swap _ c) >>> #(pmon_assoc _ _ _)⁻¹
+ ~~ a ⋊ #(br_swap _ _) >>> #(pmon_assoc _ _ _)⁻¹ >>> #(br_swap _ _) ⋉ b
}.
Class SymmetricCat `(bc:BraidedCat) :=
{ symcat_swap : forall a b:C, #((br_swap(BraidedCat:=bc)) a b) ~~ #(br_swap _ _)⁻¹
}.
+
+
+Section PreMonoidalSubCategory.
+
+ Context `(pm:PreMonoidalCat(I:=pmI)).
+ Context {Pobj}{Pmor}(S:SubCategory pm Pobj Pmor).
+ Context (Pobj_unit:Pobj pmI).
+ Context (Pobj_closed:forall {a}{b}, Pobj a -> Pobj b -> Pobj (a⊗b)).
+ Implicit Arguments Pobj_closed [[a][b]].
+ Context (Pmor_first: forall {a}{b}{c}{f}(pa:Pobj a)(pb:Pobj b)(pc:Pobj c)(pf:Pmor _ _ pa pb f),
+ Pmor _ _ (Pobj_closed pa pc) (Pobj_closed pb pc) (f ⋉ c)).
+ Context (Pmor_second: forall {a}{b}{c}{f}(pa:Pobj a)(pb:Pobj b)(pc:Pobj c)(pf:Pmor _ _ pa pb f),
+ Pmor _ _ (Pobj_closed pc pa) (Pobj_closed pc pb) (c ⋊ f)).
+ Context (Pmor_assoc: forall {a}{b}{c}(pa:Pobj a)(pb:Pobj b)(pc:Pobj c),
+ Pmor _ _
+ (Pobj_closed (Pobj_closed pa pb) pc)
+ (Pobj_closed pa (Pobj_closed pb pc))
+ #(pmon_assoc a c b)).
+ Context (Pmor_unassoc: forall {a}{b}{c}(pa:Pobj a)(pb:Pobj b)(pc:Pobj c),
+ Pmor _ _
+ (Pobj_closed pa (Pobj_closed pb pc))
+ (Pobj_closed (Pobj_closed pa pb) pc)
+ #(pmon_assoc a c b)⁻¹).
+ Context (Pmor_cancell: forall {a}(pa:Pobj a),
+ Pmor _ _ (Pobj_closed Pobj_unit pa) pa
+ #(pmon_cancell a)).
+ Context (Pmor_uncancell: forall {a}(pa:Pobj a),
+ Pmor _ _ pa (Pobj_closed Pobj_unit pa)
+ #(pmon_cancell a)⁻¹).
+ Context (Pmor_cancelr: forall {a}(pa:Pobj a),
+ Pmor _ _ (Pobj_closed pa Pobj_unit) pa
+ #(pmon_cancelr a)).
+ Context (Pmor_uncancelr: forall {a}(pa:Pobj a),
+ Pmor _ _ pa (Pobj_closed pa Pobj_unit)
+ #(pmon_cancelr a)⁻¹).
+ Implicit Arguments Pmor_first [[a][b][c][f]].
+ Implicit Arguments Pmor_second [[a][b][c][f]].
+
+ Definition PreMonoidalSubCategory_bobj (x y:S) :=
+ existT Pobj _ (Pobj_closed (projT2 x) (projT2 y)).
+
+ Definition PreMonoidalSubCategory_first_fmor (a:S) : forall {x}{y}(f:x~~{S}~~>y),
+ (PreMonoidalSubCategory_bobj x a)~~{S}~~>(PreMonoidalSubCategory_bobj y a).
+ unfold hom; simpl; intros.
+ destruct f.
+ destruct a as [a apf].
+ destruct x as [x xpf].
+ destruct y as [y ypf].
+ simpl in *.
+ exists (x0 ⋉ a).
+ apply Pmor_first; auto.
+ Defined.
+
+ Definition PreMonoidalSubCategory_second_fmor (a:S) : forall {x}{y}(f:x~~{S}~~>y),
+ (PreMonoidalSubCategory_bobj a x)~~{S}~~>(PreMonoidalSubCategory_bobj a y).
+ unfold hom; simpl; intros.
+ destruct f.
+ destruct a as [a apf].
+ destruct x as [x xpf].
+ destruct y as [y ypf].
+ simpl in *.
+ exists (a ⋊ x0).
+ apply Pmor_second; auto.
+ Defined.
+
+ Instance PreMonoidalSubCategory_first (a:S)
+ : Functor (S) (S) (fun x => PreMonoidalSubCategory_bobj x a) :=
+ { fmor := fun x y f => PreMonoidalSubCategory_first_fmor a f }.
+ unfold PreMonoidalSubCategory_first_fmor; intros; destruct a; destruct a0; destruct b; destruct f; destruct f'; simpl in *.
+ apply (fmor_respects (-⋉x)); auto.
+ unfold PreMonoidalSubCategory_first_fmor; intros; destruct a; destruct a0; simpl in *.
+ apply (fmor_preserves_id (-⋉x)); auto.
+ unfold PreMonoidalSubCategory_first_fmor; intros;
+ destruct a; destruct a0; destruct b; destruct c; destruct f; destruct g; simpl in *.
+ apply (fmor_preserves_comp (-⋉x)); auto.
+ Defined.
+
+ Instance PreMonoidalSubCategory_second (a:S)
+ : Functor (S) (S) (fun x => PreMonoidalSubCategory_bobj a x) :=
+ { fmor := fun x y f => PreMonoidalSubCategory_second_fmor a f }.
+ unfold PreMonoidalSubCategory_second_fmor; intros; destruct a; destruct a0; destruct b; destruct f; destruct f'; simpl in *.
+ apply (fmor_respects (x⋊-)); auto.
+ unfold PreMonoidalSubCategory_second_fmor; intros; destruct a; destruct a0; simpl in *.
+ apply (fmor_preserves_id (x⋊-)); auto.
+ unfold PreMonoidalSubCategory_second_fmor; intros;
+ destruct a; destruct a0; destruct b; destruct c; destruct f; destruct g; simpl in *.
+ apply (fmor_preserves_comp (x⋊-)); auto.
+ Defined.
+
+ Instance PreMonoidalSubCategory_is_Binoidal : BinoidalCat S PreMonoidalSubCategory_bobj :=
+ { bin_first := PreMonoidalSubCategory_first
+ ; bin_second := PreMonoidalSubCategory_second }.
+
+ Definition PreMonoidalSubCategory_assoc
+ : forall a b,
+ (PreMonoidalSubCategory_second a >>>> PreMonoidalSubCategory_first b) <~~~>
+ (PreMonoidalSubCategory_first b >>>> PreMonoidalSubCategory_second a).
+ admit.
+ Defined.
+
+ Definition PreMonoidalSubCategory_assoc_ll
+ : forall a b,
+ PreMonoidalSubCategory_second (a⊗b) <~~~>
+ PreMonoidalSubCategory_second b >>>> PreMonoidalSubCategory_second a.
+ intros.
+ admit.
+ Defined.
+
+ Definition PreMonoidalSubCategory_assoc_rr
+ : forall a b,
+ PreMonoidalSubCategory_first (a⊗b) <~~~>
+ PreMonoidalSubCategory_first a >>>> PreMonoidalSubCategory_first b.
+ intros.
+ admit.
+ Defined.
+
+ Definition PreMonoidalSubCategory_I := existT _ pmI (Pobj_unit).
+
+ Definition PreMonoidalSubCategory_cancelr : PreMonoidalSubCategory_first PreMonoidalSubCategory_I <~~~> functor_id _.
+ admit.
+ Defined.
+
+ Definition PreMonoidalSubCategory_cancell : PreMonoidalSubCategory_second PreMonoidalSubCategory_I <~~~> functor_id _.
+ admit.
+ Defined.
+
+ Instance PreMonoidalSubCategory_PreMonoidal : PreMonoidalCat PreMonoidalSubCategory_is_Binoidal PreMonoidalSubCategory_I :=
+ { pmon_assoc := PreMonoidalSubCategory_assoc
+ ; pmon_assoc_rr := PreMonoidalSubCategory_assoc_rr
+ ; pmon_assoc_ll := PreMonoidalSubCategory_assoc_ll
+ ; pmon_cancelr := PreMonoidalSubCategory_cancelr
+ ; pmon_cancell := PreMonoidalSubCategory_cancell
+ }.
+ admit.
+ admit.
+ admit.
+ admit.
+ admit.
+ admit.
+ admit.
+ Defined.
+
+End PreMonoidalSubCategory.