+Generalizable All Variables.
+Require Import Preamble.
+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.
+Require Import NaturalIsomorphisms_ch7_5.
+Require Import Coherence_ch7_8.
+Require Import BinoidalCategories.
+Require Import PreMonoidalCategories.
+Require Import MonoidalCategories_ch_7_8.
+
+(******************************************************************************)
+(* Facts about the center of a Binoidal or PreMonoidal Category *)
+(******************************************************************************)
+
+Lemma central_morphisms_compose `{bc:BinoidalCat}{a b c}(f:a~>b)(g:b~>c)
+ : CentralMorphism f -> CentralMorphism g -> CentralMorphism (f >>> g).
+ intros.
+ apply Build_CentralMorphism; intros.
+ abstract (setoid_rewrite <- (fmor_preserves_comp(bin_first c0));
+ setoid_rewrite associativity;
+ setoid_rewrite centralmor_first;
+ setoid_rewrite <- associativity;
+ setoid_rewrite centralmor_first;
+ setoid_rewrite associativity;
+ setoid_rewrite <- (fmor_preserves_comp(bin_first d));
+ reflexivity).
+ abstract (setoid_rewrite <- (fmor_preserves_comp(bin_second d));
+ setoid_rewrite <- associativity;
+ setoid_rewrite centralmor_second;
+ setoid_rewrite associativity;
+ setoid_rewrite centralmor_second;
+ setoid_rewrite <- associativity;
+ setoid_rewrite <- (fmor_preserves_comp(bin_second c0));
+ reflexivity).
+ Qed.
+
+(* the central morphisms of a category constitute a subcategory *)
+Definition Center `(bc:BinoidalCat) : SubCategory bc (fun _ => True) (fun _ _ _ _ f => CentralMorphism f).
+ apply Build_SubCategory; intros.
+ apply Build_CentralMorphism; intros.
+ abstract (setoid_rewrite (fmor_preserves_id(bin_first c));
+ setoid_rewrite (fmor_preserves_id(bin_first d));
+ setoid_rewrite left_identity; setoid_rewrite right_identity; reflexivity).
+ abstract (setoid_rewrite (fmor_preserves_id(bin_second c));
+ setoid_rewrite (fmor_preserves_id(bin_second d));
+ setoid_rewrite left_identity; setoid_rewrite right_identity; reflexivity).
+ apply central_morphisms_compose; auto.
+ Qed.
+
+
+Lemma first_preserves_centrality `{C:PreMonoidalCat}{a}{b}(f:a~~{C}~~>b){c} : CentralMorphism f -> CentralMorphism (f ⋉ c).
+ intro cm.
+ apply Build_CentralMorphism; simpl; intros.
+
+ set (ni_commutes (pmon_assoc_rr c c0) f) as q.
+ apply iso_shift_right' in q.
+ unfold fmor in q at 1; simpl in q.
+ rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc_rr c d) f) as q.
+ apply iso_shift_right' in q.
+ unfold fmor in q at 1; simpl in q.
+ rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc_ll b c) g) as q.
+ apply symmetry in q.
+ apply iso_shift_left' in q.
+ rewrite q.
+ clear q.
+
+ setoid_rewrite pmon_coherent_r at 1.
+ setoid_rewrite pmon_coherent_l at 1.
+ setoid_rewrite juggle3.
+ setoid_rewrite juggle3.
+ set (@iso_comp2 _ _ _ _ _ ((pmon_assoc C b c0) c)) as q.
+ setoid_rewrite q.
+ clear q.
+ setoid_rewrite right_identity.
+ unfold fmor at 2.
+ simpl.
+ setoid_rewrite (centralmor_first(CentralMorphism:=cm)).
+
+ repeat setoid_rewrite <- associativity.
+ apply comp_respects.
+ apply comp_respects; [ idtac | reflexivity ].
+ set (ni_commutes (pmon_assoc_ll a c) g) as q.
+ apply symmetry in q.
+ apply iso_shift_left' in q.
+ setoid_rewrite q.
+ clear q.
+ repeat setoid_rewrite associativity.
+ setoid_rewrite pmon_coherent_l.
+ set (pmon_coherent_l(PreMonoidalCat:=C) c a d) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ setoid_rewrite q.
+ clear q.
+ setoid_rewrite <- pmon_coherent_r.
+ setoid_rewrite iso_comp1.
+ setoid_rewrite right_identity.
+ unfold fmor at 3; simpl.
+ apply comp_respects; [ idtac | reflexivity ].
+
+ set (pmon_coherent_r a c c0) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ setoid_rewrite iso_inv_inv in q.
+ apply q.
+
+ setoid_rewrite pmon_coherent_r.
+ unfold iso_inv.
+ simpl.
+ set (@isos_forward_equal_then_backward_equal) as q.
+ unfold iso_inv in q; simpl in q.
+ apply q.
+ apply pmon_coherent_l.
+
+ (* *)
+
+ set (ni_commutes (pmon_assoc_rr a c) g) as q.
+ symmetry in q.
+ apply iso_shift_left' in q.
+ unfold fmor in q at 2.
+ simpl in q.
+ setoid_rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc _ d c) f) as q.
+ apply iso_shift_right' in q.
+ unfold fmor in q at 1; simpl in q.
+ rewrite q.
+ clear q.
+
+ set (pmon_coherent_r d a c) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ rewrite iso_inv_inv in q.
+ unfold iso_inv in q; simpl in q.
+ rewrite q.
+ clear q.
+
+ setoid_rewrite juggle3.
+ setoid_rewrite (iso_comp1 ((pmon_assoc C d c) a)).
+ setoid_rewrite right_identity.
+
+ set (ni_commutes (pmon_assoc_rr b c) g) as q.
+ symmetry in q.
+ apply iso_shift_left' in q.
+ unfold fmor in q at 2.
+ simpl in q.
+ setoid_rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc _ c0 c) f) as q.
+ unfold fmor in q; simpl in q.
+ apply iso_shift_right' in q.
+ rewrite q.
+ clear q.
+
+ set (pmon_coherent_r c0 b c) as q.
+ rewrite q.
+ clear q.
+
+ setoid_rewrite juggle3.
+ setoid_rewrite juggle3.
+ setoid_rewrite (iso_comp1 ((pmon_assoc C c0 c) b)).
+ setoid_rewrite right_identity.
+
+ setoid_rewrite pmon_coherent_r.
+ repeat setoid_rewrite associativity.
+ apply comp_respects; [ reflexivity | idtac ].
+ repeat setoid_rewrite <- associativity.
+ apply comp_respects.
+ setoid_rewrite (fmor_preserves_comp (-⋉c)).
+ apply (fmor_respects (-⋉c)).
+ apply centralmor_second.
+ set (pmon_coherent_r d b c) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ rewrite iso_inv_inv in q.
+ symmetry.
+ apply q.
+ Qed.
+
+Lemma second_preserves_centrality `{C:PreMonoidalCat}{a}{b}(f:a~~{C}~~>b){c} : CentralMorphism f -> CentralMorphism (c ⋊ f).
+ intro cm.
+ apply Build_CentralMorphism; simpl; intros.
+
+ set (ni_commutes (pmon_assoc_ll c a) g) as q.
+ symmetry in q.
+ apply iso_shift_left' in q.
+ unfold fmor in q at 2.
+ simpl in q.
+ setoid_rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc _ c d) f) as q.
+ apply symmetry in q.
+ apply iso_shift_left' in q.
+ unfold fmor in q at 1; simpl in q.
+ rewrite q.
+ clear q.
+
+ rewrite <- pmon_coherent_l.
+ setoid_rewrite <- associativity.
+ setoid_rewrite juggle3.
+ set (iso_comp2 ((pmon_assoc_ll c a) d)) as q.
+ setoid_rewrite q.
+ setoid_rewrite right_identity.
+ clear q.
+
+ set (ni_commutes (pmon_assoc_ll c b) g) as q.
+ apply symmetry in q.
+ apply iso_shift_left' in q.
+ unfold fmor in q at 1; simpl in q.
+ setoid_rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc _ c c0) f) as q.
+ unfold fmor in q; simpl in q.
+ symmetry in q.
+ apply iso_shift_left' in q.
+ rewrite q.
+ clear q.
+
+ rewrite pmon_coherent_l.
+ setoid_rewrite <- associativity.
+ setoid_rewrite juggle3.
+ set (iso_comp2 ((pmon_assoc _ c c0) b)) as q.
+ setoid_rewrite q.
+ setoid_rewrite right_identity.
+ clear q.
+ setoid_rewrite pmon_coherent_l.
+
+ repeat setoid_rewrite associativity.
+ apply comp_respects; [ reflexivity | idtac ].
+ repeat setoid_rewrite <- associativity.
+ apply comp_respects.
+ setoid_rewrite (fmor_preserves_comp (c⋊-)).
+ apply (fmor_respects (c⋊-)).
+ apply centralmor_first.
+ set (pmon_coherent_l b c d) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ apply q.
+
+ (* *)
+ set (ni_commutes (pmon_assoc_ll d c) f) as q.
+ apply iso_shift_right' in q.
+ unfold fmor in q at 1; simpl in q.
+ rewrite q.
+ clear q.
+
+ set (ni_commutes (pmon_assoc_rr c a) g) as q.
+ apply symmetry in q.
+ unfold fmor in q at 2; simpl in q.
+ apply iso_shift_left' in q.
+ rewrite q.
+ clear q.
+
+ setoid_rewrite juggle3.
+ set (pmon_coherent_r d c a) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ setoid_rewrite iso_inv_inv in q.
+ setoid_rewrite q.
+ clear q.
+ setoid_rewrite <- pmon_coherent_l.
+ set (iso_comp1 (((pmon_assoc_ll d c) a))) as q.
+ setoid_rewrite q.
+ clear q.
+ setoid_rewrite right_identity.
+ setoid_rewrite juggle3.
+ setoid_rewrite (centralmor_second(CentralMorphism:=cm)).
+ symmetry.
+ apply iso_shift_left.
+ setoid_rewrite pmon_coherent_r.
+ set (pmon_coherent_l c d b) as q.
+ apply isos_forward_equal_then_backward_equal in q.
+ setoid_rewrite q.
+ clear q.
+ apply iso_shift_right.
+ setoid_rewrite iso_inv_inv.
+ repeat setoid_rewrite <- associativity.
+
+ set (ni_commutes (pmon_assoc_ll c0 c) f) as x.
+ setoid_rewrite <- pmon_coherent_l.
+ symmetry in x.
+ unfold fmor in x at 2; simpl in x.
+ setoid_rewrite <- x.
+ clear x.
+
+ set (ni_commutes (pmon_assoc_rr c b) g) as x.
+ symmetry in x.
+ unfold fmor in x at 2; simpl in x.
+ setoid_rewrite pmon_coherent_l.
+ setoid_rewrite <- pmon_coherent_r.
+ repeat setoid_rewrite associativity.
+ setoid_rewrite x.
+ clear x.
+ setoid_rewrite <- associativity.
+ setoid_rewrite juggle3.
+ setoid_rewrite pmon_coherent_r.
+ set (iso_comp1 ((pmon_assoc C c0 b) c)) as x.
+ setoid_rewrite x.
+ clear x.
+ setoid_rewrite right_identity.
+ reflexivity.
+ Qed.
+
+Section CenterMonoidal.
+
+ Context `(mc:PreMonoidalCat(I:=pI)).
+
+ Definition CenterMonoidal_Fobj : (Center mc) ×× (Center mc) -> Center mc.
+ intro.
+ destruct X as [a b].
+ destruct a as [a apf].
+ destruct b as [b bpf].
+ exists (a ⊗ b); auto.
+ Defined.
+
+ Definition CenterMonoidal_F_fmor (a b:(Center mc) ×× (Center mc)) :
+ (a~~{(Center mc) ×× (Center mc)}~~>b) ->
+ ((CenterMonoidal_Fobj a)~~{Center mc}~~>(CenterMonoidal_Fobj b)).
+ destruct a as [[a1 a1'] [a2 a2']].
+ destruct b as [[b1 b1'] [b2 b2']].
+ intro f.
+ destruct f as [[f1 f1'] [f2 f2']].
+ simpl in *.
+ unfold hom.
+ simpl.
+ exists (f1 ⋉ a2 >>> b1 ⋊ f2).
+ apply central_morphisms_compose.
+ apply first_preserves_centrality; auto.
+ apply second_preserves_centrality; auto.
+ Defined.
+
+ Definition CenterMonoidal_F : Functor _ _ CenterMonoidal_Fobj.
+ refine {| fmor := CenterMonoidal_F_fmor |}.
+ intros.
+ destruct a as [[a1 a1'] [a2 a2']].
+ destruct b as [[b1 b1'] [b2 b2']].
+ destruct f as [[f1 f1'] [f2 f2']].
+ destruct f' as [[g1 g1'] [g2 g2']].
+ simpl in *.
+ destruct H.
+ apply comp_respects.
+ set (fmor_respects(-⋉a2)) as q; apply q; auto.
+ set (fmor_respects(b1⋊-)) as q; apply q; auto.
+ intros.
+ destruct a as [[a1 a1'] [a2 a2']].
+ simpl in *.
+ setoid_rewrite (fmor_preserves_id (-⋉a2)).
+ setoid_rewrite (fmor_preserves_id (a1⋊-)).
+ apply left_identity.
+ intros.
+ destruct a as [[a1 a1'] [a2 a2']].
+ destruct b as [[b1 b1'] [b2 b2']].
+ destruct c as [[c1 c1'] [c2 c2']].
+ destruct f as [[f1 f1'] [f2 f2']].
+ destruct g as [[g1 g1'] [g2 g2']].
+ simpl in *.
+ setoid_rewrite juggle3.
+ setoid_rewrite <- (centralmor_first(CentralMorphism:=g1')).
+ setoid_rewrite <- juggle3.
+ setoid_rewrite <- fmor_preserves_comp.
+ reflexivity.
+ Defined.
+
+ Definition center_I : Center mc := exist _ pI I.
+
+ Definition center_cancelr : (func_rlecnac center_I >>>> CenterMonoidal_F) <~~~> functor_id (Center mc).
+ Definition center_cancelr_niso : ∀A : Center mc, CenterMonoidal_Fobj (pair_obj A center_I) ≅ A.
+ intros.
+ destruct A; simpl.
+ set (ni_iso (pmon_cancelr mc) x) as q.
+ (*refine {| iso_forward := #q ; iso_backward := iso_backward q |}.*)
+ admit.
+ Defined.
+ refine {| ni_iso := center_cancelr_niso |}.
+ admit.
+ Defined.
+
+ Definition center_cancell : (func_llecnac center_I >>>> CenterMonoidal_F) <~~~> functor_id (Center mc).
+ Definition center_cancell_niso : ∀A : Center mc, CenterMonoidal_Fobj (pair_obj center_I A) ≅ A.
+ admit.
+ Defined.
+ refine {| ni_iso := center_cancell_niso |}.
+ admit.
+ Defined.
+
+ Definition center_assoc :
+ ((CenterMonoidal_F **** (functor_id _)) >>>> CenterMonoidal_F)
+ <~~~> func_cossa >>>> ((((functor_id _) **** CenterMonoidal_F) >>>> CenterMonoidal_F)).
+
+ Definition center_assoc_niso : ∀A : (Center mc ×× Center mc) ×× Center mc,
+ ((((CenterMonoidal_F **** (functor_id _)) >>>> CenterMonoidal_F) A))
+ ≅ ((func_cossa >>>> ((((functor_id _) **** CenterMonoidal_F) >>>> CenterMonoidal_F))) A).
+ admit.
+ Defined.
+
+ refine {| ni_iso := center_assoc_niso |}.
+ admit.
+ Defined.
+
+ Instance CenterMonoidal : MonoidalCat _ _ CenterMonoidal_F (exist _ pI I) :=
+ { mon_cancelr := center_cancelr
+ ; mon_cancell := center_cancell
+ ; mon_assoc := center_assoc
+ }.
+ admit.
+ admit.
+ Defined.
+
+End CenterMonoidal.