X-Git-Url: http://git.megacz.com/?p=coq-hetmet.git;a=blobdiff_plain;f=src%2FReificationCategory.v;h=b4d444abb8bc25471064c1e415c01d099b6f8678;hp=4d83b787e3b557fda6c6ccc410423499da39b75a;hb=20a9b4934a97e6801d6785ac940f771cb74a8cc1;hpb=76f4613eaa5989e29bfd59d716c216ee5386c5f7 diff --git a/src/ReificationCategory.v b/src/ReificationCategory.v index 4d83b78..b4d444a 100644 --- a/src/ReificationCategory.v +++ b/src/ReificationCategory.v @@ -9,6 +9,79 @@ Generalizable All Variables. Require Import Preamble. Require Import General. -Require Import NaturalDeduction. -Require Import Coq.Strings.String. -Require Import Coq.Lists.List. +Require Import Categories_ch1_3. +Require Import Functors_ch1_4. +Require Import Isomorphisms_ch1_5. +Require Import ProductCategories_ch1_6_1. +Require Import OppositeCategories_ch1_6_2. +Require Import Enrichment_ch2_8. +Require Import Subcategories_ch7_1. +Require Import NaturalTransformations_ch7_4. +Require Import NaturalIsomorphisms_ch7_5. +Require Import MonoidalCategories_ch7_8. +Require Import Coherence_ch7_8. +Require Import Enrichment_ch2_8. +Require Import RepresentableStructure_ch7_2. +Require Import Reification. +Require Import WeakFunctorCategory. +Require Import SmallSMMEs. + +Inductive ReificationOrIdentity : SMMEs -> SMMEs -> Type := + | roi_id : forall smme:SMMEs, ReificationOrIdentity smme smme + | roi_reif : forall s1 s2:SMMEs, Reification s1 s2 (mon_i s2) -> ReificationOrIdentity s1 s2. + +Definition reificationOrIdentityFunc + : forall s1 s2, ReificationOrIdentity s1 s2 -> { fobj : _ & Functor s1 s2 fobj }. + intros. + destruct X. + exists (fun x => x). + apply functor_id. + exists (reification_rstar_obj r). + apply r. + Defined. + +Definition compose_reifications (s0 s1 s2:SMMEs) : + Reification s0 s1 (mon_i s1) -> Reification s1 s2 (mon_i s2) -> Reification s0 s2 (mon_i s2). + intros. + refine + {| reification_rstar := MonoidalFunctorsCompose _ _ _ _ _ (reification_rstar X) (reification_rstar X0) + ; reification_r := fun K => (reification_r X K) >>>> (reification_r X0 (mon_i s1)) + |}. + intro K. + set (ni_associativity (reification_r X K) (reification_r X0 (mon_i s1)) (RepresentableFunctor s2 (mon_i s2))) as q. + eapply ni_comp. + apply q. + clear q. + set (reification_commutes X K) as comm1. + set (reification_commutes X0 (mon_i s1)) as comm2. + admit. + Defined. + +Definition reificationOrIdentityComp + : forall s1 s2 s3, ReificationOrIdentity s1 s2 -> ReificationOrIdentity s2 s3 -> ReificationOrIdentity s1 s3. + intros. + destruct X. + apply X0. + destruct X0. + apply (roi_reif _ _ r). + apply (roi_reif _ _ (compose_reifications _ _ _ r r0)). + Defined. + +Definition MorphismsOfCategoryOfReifications : @SmallFunctors SMMEs. + refine {| small_func := ReificationOrIdentity + ; small_func_id := fun s => roi_id s + ; small_func_func := fun smme1 smme2 f => projT2 (reificationOrIdentityFunc _ _ f) + ; small_func_comp := reificationOrIdentityComp + |}; intros; simpl. + apply if_id. + destruct f as [|fobj f]; simpl in *. + apply if_inv. + apply if_left_identity. + destruct g as [|gobj g]; simpl in *. + apply if_inv. + apply if_right_identity. + apply if_id. + Defined. + +Definition CategoryOfReifications := + WeakFunctorCategory MorphismsOfCategoryOfReifications.