Library TypeTheory.Displayed_Cats.Examples
Examples
- category of topological space as total category
- arrow precategories
- objects with N-actions
- elements, over hSet
Require Import UniMath.Foundations.Sets.
Require Import UniMath.CategoryTheory.Categories.
Require Import UniMath.CategoryTheory.Monads.
Require Import UniMath.Topology.Topology.
Require Import TypeTheory.Auxiliary.Auxiliary.
Require Import TypeTheory.Auxiliary.CategoryTheoryImports.
Require Import TypeTheory.Auxiliary.UnicodeNotations.
Require Import TypeTheory.Displayed_Cats.Auxiliary.
Require Import TypeTheory.Displayed_Cats.Core.
Require Import TypeTheory.Displayed_Cats.Constructions.
Require Import TypeTheory.Displayed_Cats.Limits.
Require Import TypeTheory.Displayed_Cats.Fibrations.
Require Import TypeTheory.Displayed_Cats.SIP.
Local Open Scope mor_disp_scope.
Local Set Automatic Introduction.
Module group.
Definition grp_structure_data (X : hSet) : UU
:= (X -> X -> X) × X × (X -> X).
Definition mult {X : hSet} (G : grp_structure_data X)
: X -> X -> X := pr1 G.
Definition e {X : hSet} (G : grp_structure_data X)
: X := pr1 (pr2 G).
Definition inv {X : hSet} (G : grp_structure_data X)
: X -> X := pr2 (pr2 G).
Definition grp_structure_axioms {X : hSet}
(G : grp_structure_data X) : UU
:= (∏ x y z : X, mult G x (mult G y z) = mult G (mult G x y) z)
×
(∏ x : X, mult G x (e G) = x)
×
(∏ x : X, mult G (e G) x = x)
×
(∏ x : X, mult G x (inv G x) = e G)
×
(∏ x : X, mult G (inv G x) x = e G).
Definition grp_assoc {X : hSet} {G : grp_structure_data X}
(GH : grp_structure_axioms G)
: ∏ x y z : X, mult G x (mult G y z) = mult G (mult G x y) z := pr1 GH.
Definition grp_e_r {X : hSet} {G : grp_structure_data X}
(GH : grp_structure_axioms G)
: ∏ x : X, mult G x (e G) = x := pr1 (pr2 GH).
Definition grp_e_l {X : hSet} {G : grp_structure_data X}
(GH : grp_structure_axioms G)
: ∏ x : X, mult G (e G) x = x := pr1 (pr2 (pr2 GH)).
Definition grp_inv_r {X : hSet} {G : grp_structure_data X}
(GH : grp_structure_axioms G)
: ∏ x : X, mult G x (inv G x) = e G := pr1 (pr2 (pr2 (pr2 GH))).
Definition grp_inv_l {X : hSet} {G : grp_structure_data X}
(GH : grp_structure_axioms G)
: ∏ x : X, mult G (inv G x) x = e G := pr2 (pr2 (pr2 (pr2 GH))).
Definition grp_structure (X : hSet) : UU
:= ∑ G : grp_structure_data X, grp_structure_axioms G.
Coercion grp_data {X} (G : grp_structure X) : grp_structure_data X := pr1 G.
Coercion grp_axioms {X} (G : grp_structure X) : grp_structure_axioms _ := pr2 G.
Definition is_grp_hom {X Y : hSet} (f : X -> Y)
(GX : grp_structure X) (GY : grp_structure Y) : UU
:= (∏ x x', f (mult GX x x') = mult GY (f x) (f x'))
×
(f (e GX) = e GY).
Definition grp_hom_mult {X Y : hSet} {f : X -> Y}
{GX : grp_structure X} {GY : grp_structure Y}
(is : is_grp_hom f GX GY)
: ∏ x x', f (mult GX x x') = mult GY (f x) (f x') := pr1 is.
Definition grp_hom_e {X Y : hSet} {f : X -> Y}
{GX : grp_structure X} {GY : grp_structure Y}
(is : is_grp_hom f GX GY)
: f (e GX) = e GY := pr2 is.
Definition isaprop_is_grp_hom {X Y : hSet} (f : X -> Y)
(GX : grp_structure X) (GY : grp_structure Y)
: isaprop (is_grp_hom f GX GY).
Proof.
repeat apply (isofhleveldirprod);
repeat (apply impred; intro);
apply setproperty.
Qed.
Definition disp_grp : disp_cat hset_category.
Proof.
use disp_struct.
- exact grp_structure.
- intros X Y GX GY f. exact (is_grp_hom f GX GY).
- intros. apply isaprop_is_grp_hom.
- intros. simpl.
repeat split; intros; apply idpath.
- intros ? ? ? ? ? ? ? ? Gf Gg ; simpl in *;
repeat split; intros; simpl; cbn.
+ rewrite (grp_hom_mult Gf).
apply (grp_hom_mult Gg).
+ rewrite (grp_hom_e Gf).
apply (grp_hom_e Gg).
Defined.
End group.
Lemma is_lim_comp {X : UU} {U V : TopologicalSet} (f : X → U) (g : U → V) (F : Filter X) (l : U) :
is_lim f F l → continuous_at g l →
is_lim (funcomp f g) F (g l).
Proof.
apply filterlim_comp.
Qed.
Lemma continuous_comp {X Y Z : TopologicalSet} (f : X → Y) (g : Y → Z) :
continuous f → continuous g →
continuous (funcomp f g).
Proof.
intros Hf Hg x.
refine (is_lim_comp _ _ _ _ _ _).
apply Hf.
apply Hg.
Qed.
Lemma isaprop_continuous ( x y : TopologicalSet)
(f : x → y)
: isaprop (continuous (λ x0 : x, f x0)).
Proof.
do 3 (apply impred_isaprop; intro).
apply propproperty.
Qed.
is_lim f F l → continuous_at g l →
is_lim (funcomp f g) F (g l).
Proof.
apply filterlim_comp.
Qed.
Lemma continuous_comp {X Y Z : TopologicalSet} (f : X → Y) (g : Y → Z) :
continuous f → continuous g →
continuous (funcomp f g).
Proof.
intros Hf Hg x.
refine (is_lim_comp _ _ _ _ _ _).
apply Hf.
apply Hg.
Qed.
Lemma isaprop_continuous ( x y : TopologicalSet)
(f : x → y)
: isaprop (continuous (λ x0 : x, f x0)).
Proof.
do 3 (apply impred_isaprop; intro).
apply propproperty.
Qed.
END TODO
Definition top_disp_cat_ob_mor : disp_cat_ob_mor HSET.
Proof.
mkpair.
- intro X. exact (isTopologicalSet (pr1hSet X)).
- cbn. intros X Y T U f.
apply (@continuous (pr1hSet X,,T) (pr1hSet Y,,U) f).
Defined.
Definition top_disp_cat_data : disp_cat_data HSET.
Proof.
exists top_disp_cat_ob_mor.
mkpair.
- intros X XX. cbn. unfold continuous. intros.
unfold continuous_at. cbn. unfold is_lim. cbn.
unfold filterlim. cbn. unfold filter_le. cbn.
intros. assumption.
- intros X Y Z f g XX YY ZZ Hf Hg.
use (@continuous_comp (pr1hSet X,,XX) (pr1hSet Y,,YY) (pr1hSet Z,,ZZ) f g);
assumption.
Defined.
Definition top_disp_cat_axioms : disp_cat_axioms SET top_disp_cat_data.
Proof.
repeat split; cbn; intros; try (apply proofirrelevance, isaprop_continuous).
apply isasetaprop. apply isaprop_continuous.
Defined.
Definition disp_top : disp_cat SET := _ ,, top_disp_cat_axioms.
The displayed arrow category
Section Arrow_Disp.
Context (C:category).
Definition arrow_disp_ob_mor : disp_cat_ob_mor (C × C).
Proof.
exists (fun xy : (C × C) => (pr1 xy) --> (pr2 xy)).
simpl; intros xx' yy' g h ff'.
exact (pr1 ff' ;; h = g ;; pr2 ff')%mor.
Defined.
Definition arrow_id_comp : disp_cat_id_comp _ arrow_disp_ob_mor.
Proof.
split.
- simpl; intros.
eapply pathscomp0. apply id_left. apply pathsinv0, id_right.
- simpl; intros x y z f g xx yy zz ff gg.
eapply pathscomp0. apply @pathsinv0, assoc.
eapply pathscomp0. apply maponpaths, gg.
eapply pathscomp0. apply assoc.
eapply pathscomp0. apply cancel_postcomposition, ff.
apply pathsinv0, assoc.
Qed.
Definition arrow_data : disp_cat_data _
:= (arrow_disp_ob_mor ,, arrow_id_comp).
Lemma arrow_axioms : disp_cat_axioms (C × C) arrow_data.
Proof.
repeat apply tpair; intros; try apply homset_property.
apply isasetaprop, homset_property.
Qed.
Definition arrow_disp : disp_cat (C × C)
:= (arrow_data ,, arrow_axioms).
End Arrow_Disp.
Context (C:category).
Definition arrow_disp_ob_mor : disp_cat_ob_mor (C × C).
Proof.
exists (fun xy : (C × C) => (pr1 xy) --> (pr2 xy)).
simpl; intros xx' yy' g h ff'.
exact (pr1 ff' ;; h = g ;; pr2 ff')%mor.
Defined.
Definition arrow_id_comp : disp_cat_id_comp _ arrow_disp_ob_mor.
Proof.
split.
- simpl; intros.
eapply pathscomp0. apply id_left. apply pathsinv0, id_right.
- simpl; intros x y z f g xx yy zz ff gg.
eapply pathscomp0. apply @pathsinv0, assoc.
eapply pathscomp0. apply maponpaths, gg.
eapply pathscomp0. apply assoc.
eapply pathscomp0. apply cancel_postcomposition, ff.
apply pathsinv0, assoc.
Qed.
Definition arrow_data : disp_cat_data _
:= (arrow_disp_ob_mor ,, arrow_id_comp).
Lemma arrow_axioms : disp_cat_axioms (C × C) arrow_data.
Proof.
repeat apply tpair; intros; try apply homset_property.
apply isasetaprop, homset_property.
Qed.
Definition arrow_disp : disp_cat (C × C)
:= (arrow_data ,, arrow_axioms).
End Arrow_Disp.
Objects with N-action
Section NAction.
Context (C:category).
Definition NAction_disp_ob_mor : disp_cat_ob_mor C.
Proof.
exists (fun c => c --> c).
intros x y xx yy f. exact (f ;; yy = xx ;; f)%mor.
Defined.
Definition NAction_id_comp : disp_cat_id_comp C NAction_disp_ob_mor.
Proof.
split.
- simpl; intros.
eapply pathscomp0. apply id_left. apply pathsinv0, id_right.
- simpl; intros x y z f g xx yy zz ff gg.
eapply pathscomp0. apply @pathsinv0, assoc.
eapply pathscomp0. apply maponpaths, gg.
eapply pathscomp0. apply assoc.
eapply pathscomp0. apply cancel_postcomposition, ff.
apply pathsinv0, assoc.
Qed.
Definition NAction_data : disp_cat_data C
:= (NAction_disp_ob_mor ,, NAction_id_comp).
Lemma NAction_axioms : disp_cat_axioms C NAction_data.
Proof.
repeat apply tpair; intros; try apply homset_property.
apply isasetaprop, homset_property.
Qed.
Definition NAction_disp : disp_cat C
:= (NAction_data ,, NAction_axioms).
End NAction.
Elements of sets
Section Elements_Disp.
Definition elements_ob_mor : disp_cat_ob_mor SET.
Proof.
use tpair.
- simpl. exact (fun X => X).
- simpl. intros X Y x y f. exact (f x = y).
Defined.
Lemma elements_id_comp : disp_cat_id_comp SET elements_ob_mor.
Proof.
apply tpair; simpl.
- intros X x. apply idpath.
- intros X Y Z f g x y z e_fx_y e_gy_z. cbn.
eapply pathscomp0. apply maponpaths, e_fx_y. apply e_gy_z.
Qed.
Definition elements_data : disp_cat_data SET
:= (_ ,, elements_id_comp).
Lemma elements_axioms : disp_cat_axioms SET elements_data.
Proof.
repeat split; intros; try apply setproperty.
apply isasetaprop; apply setproperty.
Qed.
Definition elements_universal : disp_cat SET
:= (_ ,, elements_axioms).
Definition disp_cat_of_elements {C : category} (P : functor C SET)
:= reindex_disp_cat P elements_universal.
Definition precat_of_elements {C : category} (P : functor C SET)
:= total_category (disp_cat_of_elements P).
End Elements_Disp.
Section functor_algebras.
Context {C : category} (F : functor C C).
Definition functor_alg_ob : C -> UU := λ c, F c --> c.
Definition functor_alg_mor
: ∏ (x y : C), functor_alg_ob x → functor_alg_ob y → C⟦x,y⟧ → UU.
Proof.
intros c d a a' r. exact ( (#F r)%cat · a' = a · r).
Defined.
Definition isaprop_functor_alg_mor
: ∏ (x y : C) a a' r,
isaprop (functor_alg_mor x y a a' r).
Proof.
intros. simpl. apply homset_property.
Qed.
Definition functor_alg_id
: ∏ (x : C) (a : functor_alg_ob x), functor_alg_mor _ _ a a (identity x ).
Proof.
intros; unfold functor_alg_mor.
rewrite functor_id;
rewrite id_left;
apply pathsinv0; apply id_right .
Qed.
Definition functor_alg_comp
: ∏ (x y z : C) a b c (f : C⟦x,y⟧) (g : C⟦y,z⟧),
functor_alg_mor _ _ a b f
→ functor_alg_mor _ _ b c g
→ functor_alg_mor _ _ a c (f ;; g).
Proof.
cbn; intros ? ? ? ? ? ? ? ? X X0;
unfold functor_alg_mor in *;
rewrite functor_comp;
rewrite <-assoc; rewrite X0;
rewrite assoc; rewrite X;
apply (!assoc _ _ _ ) .
Qed.
Definition disp_cat_functor_alg : disp_cat C
:= disp_struct _ _
functor_alg_mor
isaprop_functor_alg_mor
functor_alg_id
functor_alg_comp.
Definition total_functor_alg : category := total_category disp_cat_functor_alg.
Lemma isaset_functor_alg_ob : ∏ x : C, isaset (functor_alg_ob x).
Proof.
intro c.
apply homset_property.
Qed.
Lemma is_univalent_disp_functor_alg : is_univalent_disp disp_cat_functor_alg.
Proof.
use is_univalent_disp_from_SIP_data.
- apply isaset_functor_alg_ob.
- unfold functor_alg_mor.
intros x a a' H H'.
rewrite functor_id in H'.
rewrite id_left in H'.
rewrite id_right in H'.
apply H'.
Defined.
Definition iso_cleaving_functor_alg : iso_cleaving disp_cat_functor_alg.
Proof.
intros c c' i d.
cbn in *.
mkpair.
- exact (compose (compose (functor_on_iso F i) d) (iso_inv_from_iso i)).
- cbn. unfold iso_disp. cbn.
mkpair.
+ abstract (
etrans; [eapply pathsinv0; apply id_right |];
repeat rewrite <- assoc;
do 2 apply maponpaths;
apply pathsinv0; apply iso_after_iso_inv
).
+ mkpair.
* unfold functor_alg_mor.
cbn. repeat rewrite assoc.
unfold functor_alg_mor. cbn.
rewrite <- functor_comp.
rewrite iso_after_iso_inv.
rewrite functor_id.
rewrite id_left. apply idpath.
* split; apply homset_property.
Defined.
Require Import UniMath.CategoryTheory.limits.graphs.colimits.
Require Import UniMath.CategoryTheory.limits.graphs.limits.
Local Notation "'π'" := (pr1_category disp_cat_functor_alg).
Definition creates_limits_functor_alg
: creates_limits disp_cat_functor_alg.
Proof.
intros J D x L isL.
unfold creates_limit. cbn.
transparent assert (FC : (cone (mapdiagram π D) (F x))).
{ use mk_cone.
- intro j.
eapply compose.
apply ((#F)%cat (coneOut L j )).
cbn. exact (pr2 (dob D j)).
- abstract (
intros; cbn;
assert (XR := pr2 (dmor D e)); cbn in XR;
etrans; [eapply pathsinv0; apply assoc |];
etrans; [apply maponpaths, (!XR) |];
etrans; [apply assoc |];
apply maponpaths_2;
rewrite <- functor_comp;
apply maponpaths;
apply (coneOutCommutes L)
).
}
transparent assert (LL : (LimCone (mapdiagram π D))).
{ use mk_LimCone. apply x. apply L. apply isL. }
mkpair.
- mkpair.
+ mkpair.
* use (limArrow LL). apply FC.
* abstract (
mkpair ;
[
intro j; cbn;
set (XR := limArrowCommutes LL _ FC); cbn in XR;
apply pathsinv0; apply XR
| cbn; intros i j e;
apply subtypeEquality;
[ intro; apply homset_property |];
cbn; apply (coneOutCommutes L)
]).
+ abstract (
intro t; cbn;
use total2_paths_f;
[ cbn;
apply (limArrowUnique LL);
induction t as [t [H1 H2]]; cbn in *;
intro j;
apply pathsinv0, H1 |];
apply proofirrelevance;
apply isofhleveltotal2;
[ apply impred_isaprop; intro; apply homset_property |];
intros; do 3 (apply impred_isaprop; intro);
apply (homset_property (total_category _ ))
).
- cbn.
intros x' CC.
set (πCC := mapcone π D CC).
use unique_exists.
+ mkpair.
* cbn.
use (limArrow LL _ πCC).
* set (XR := limArrowCommutes LL).
cbn in XR.
set (H1:= coneOutCommutes CC). simpl in H1.
destruct x' as [c a]. cbn.
unfold disp_cat_functor_alg in a. cbn in a.
cbn in πCC.
transparent assert (X : (cone (mapdiagram π D) (F c))).
{ use mk_cone.
- intro j.
apply (λ f, a · f). cbn.
apply (coneOut CC j).
- abstract (
intros u v e; cbn;
rewrite <- assoc;
apply maponpaths;
apply (maponpaths pr1 (coneOutCommutes CC _ _ _ ))
).
}
{
unfold functor_alg_mor.
pathvia (limArrow LL _ X).
- apply (limArrowUnique LL).
intro j. rewrite <- assoc.
rewrite (limArrowCommutes LL).
cbn.
rewrite assoc.
rewrite <- functor_comp.
etrans. apply maponpaths_2. apply maponpaths.
apply (limArrowCommutes LL). cbn.
set (H := pr2 (coneOut CC j)). cbn in H. apply H.
- apply pathsinv0.
use (limArrowUnique LL).
intro j.
rewrite <- assoc.
rewrite (limArrowCommutes LL).
cbn.
apply idpath.
}
+ simpl.
intro j.
apply subtypeEquality.
{ intro. apply homset_property. }
cbn. apply (limArrowCommutes LL).
+ intros.
apply impred_isaprop. intro t. (apply (homset_property (total_category _ ))).
+ simpl.
intros.
apply subtypeEquality.
{ intro. apply homset_property. }
apply (limArrowUnique LL).
intro u.
specialize (X u).
apply (maponpaths pr1 X).
Defined.
End functor_algebras.
Section monad_algebras.
Context {C : category} (T : Monad C).
Let T' : C ⟶ C := T.
Let FAlg : category := total_functor_alg T'.
Definition isMonadAlg (Xa : FAlg) : UU
:= η T (pr1 Xa) · pr2 Xa = identity _
×
(#T')%cat (pr2 Xa) · pr2 Xa = μ T _ · pr2 Xa.
Definition disp_cat_monad_alg_over_functor_alg : disp_cat FAlg
:= disp_full_sub _ isMonadAlg.
Definition disp_cat_monad_alg : disp_cat C
:= sigma_disp_cat disp_cat_monad_alg_over_functor_alg.
End monad_algebras.
Require Import UniMath.CategoryTheory.categories.StandardCategories.
Section over_terminal_category.
Variable C : category.
Definition disp_over_unit_data : disp_cat_data unit_category.
Proof.
mkpair.
- mkpair.
+ intro. apply (ob C).
+ simpl. intros x y c c' e. apply (C ⟦c, c'⟧).
- mkpair.
+ simpl. intros. apply identity.
+ intros ? ? ? ? ? a b c f g.
apply (compose (C:=C) f g ).
Defined.
Definition disp_over_unit_axioms : disp_cat_axioms _ disp_over_unit_data.
Proof.
repeat split; cbn; intros.
- apply id_left.
- etrans. apply id_right.
apply pathsinv0. unfold mor_disp. cbn.
apply transportf_const.
- etrans. apply assoc.
apply pathsinv0. unfold mor_disp. cbn.
apply transportf_const.
- apply homset_property.
Qed.
Definition disp_over_unit : disp_cat _ := _ ,, disp_over_unit_axioms.
End over_terminal_category.
Section cartesian_product_pb.
Variable C C' : category.
Definition disp_cartesian : disp_cat C
:= reindex_disp_cat (functor_to_unit C) (disp_over_unit C').
Definition cartesian : category := total_category disp_cartesian.
End cartesian_product_pb.
Section arrow.
Variable C : category.
Definition disp_arrow_data : disp_cat_data (cartesian C C).
Proof.
mkpair.
- mkpair.
+ intro H.
exact (pr1 H --> pr2 H).
+ cbn. intros xy ab f g h.
exact (compose f (pr2 h) = compose (pr1 h) g ).
- split; intros.
+ cbn.
apply pathsinv0.
etrans. apply id_left.
cbn in xx.
unfold mor_disp. cbn.
etrans. eapply pathsinv0. apply id_right.
apply maponpaths. apply pathsinv0.
apply transportf_const.
+ cbn in *.
unfold mor_disp. cbn.
etrans. apply maponpaths. apply transportf_const.
etrans. apply assoc.
etrans. apply maponpaths_2. apply X.
etrans. eapply pathsinv0, assoc.
etrans. apply maponpaths. apply X0.
apply assoc.
Defined.
Definition disp_arrow_axioms : disp_cat_axioms _ disp_arrow_data.
Proof.
repeat split; intros; cbn;
try apply homset_property.
apply isasetaprop.
apply homset_property.
Qed.
Definition disp_arrow : disp_cat (cartesian C C) := _ ,, disp_arrow_axioms.
Definition arrow : category := total_category disp_arrow.
Definition disp_domain : disp_cat C := sigma_disp_cat disp_arrow.
Definition total_domain := total_category disp_domain.
End arrow.
Section cartesian_product.
Variables C C' : category.
Definition disp_cartesian_ob_mor : disp_cat_ob_mor C.
Proof.
mkpair.
- exact (fun c => C').
- cbn. intros x y x' y' f. exact (C'⟦x', y'⟧).
Defined.
Definition disp_cartesian_data : disp_cat_data C.
Proof.
exists disp_cartesian_ob_mor.
mkpair; cbn.
- intros; apply identity.
- intros ? ? ? ? ? ? ? ? f g. apply (f · g).
Defined.
Definition disp_cartesian_axioms : disp_cat_axioms _ disp_cartesian_data.
Proof.
repeat split; intros; cbn.
- etrans. apply id_left.
apply pathsinv0.
etrans. unfold mor_disp. cbn. apply transportf_const.
apply idpath.
- etrans. apply id_right.
apply pathsinv0.
etrans. unfold mor_disp. cbn. apply transportf_const.
apply idpath.
- etrans. apply assoc.
apply pathsinv0.
etrans. unfold mor_disp. cbn. apply transportf_const.
apply idpath.
- apply homset_property.
Qed.
Definition disp_cartesian' : disp_cat C := _ ,, disp_cartesian_axioms.
End cartesian_product.