Exponentiable morphisms

We define an exponentiable morphism f : I ⟶ J to be a morphism with a functorial choice of pullbacks, given by ChosenPullbacksAlong f, together with a right adjoint to the pullback functor ChosenPullbacksAlong.pulback f : Over J ⥤ Over I. We call this right adjoint the pushforward functor along f.

Main results

• The identity morphisms are exponentiable.
• The composition of exponentiable morphisms is exponentiable.

TODO

• Any pullback of an exponentiable morphism is exponentiable.

class CategoryTheory.ExponentiableMorphism {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] : Type (max u v)

A morphism f : I ⟶ J is exponentiable if the pullback functor Over J ⥤ Over I has a right adjoint.

• pushforward : Functor (Over I) (Over J)

  The pushforward functor

• pullbackPushforwardAdj : ChosenPullbacksAlong.pullback f ⊣ pushforward f

  The pushforward functor is right adjoint to the pullback functor

@[reducible, inline]

abbrev CategoryTheory.IsExponentiable {C : Type u} [Category.{v, u} C] [ChosenPullbacks C] : MorphismProperty C

A morphism f : I ⟶ J is exponentiable if the pullback functor Over J ⥤ Over I has a right adjoint.

Equations

• CategoryTheory.IsExponentiable f = (CategoryTheory.ChosenPullbacksAlong.pullback f).IsLeftAdjoint

instance CategoryTheory.ExponentiableMorphism.isExponentiable {C : Type u} [Category.{v, u} C] [ChosenPullbacks C] {I J : C} (f : I ⟶ J) [ExponentiableMorphism f] : IsExponentiable f

def CategoryTheory.ExponentiableMorphism.ev {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] : (pushforward f).comp (ChosenPullbacksAlong.pullback f) ⟶ Functor.id (Over I)

The dependent evaluation natural transformation as the counit of the adjunction.

Equations

• CategoryTheory.ExponentiableMorphism.ev f = (CategoryTheory.ExponentiableMorphism.pullbackPushforwardAdj f).counit

def CategoryTheory.ExponentiableMorphism.coev {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] : Functor.id (Over J) ⟶ (ChosenPullbacksAlong.pullback f).comp (pushforward f)

The dependent coevaluation natural transformation as the unit of the adjunction.

Equations

• CategoryTheory.ExponentiableMorphism.coev f = (CategoryTheory.ExponentiableMorphism.pullbackPushforwardAdj f).unit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.ev_def {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] : ev f = (pullbackPushforwardAdj f).counit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.coev_def {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] : coev f = (pullbackPushforwardAdj f).unit

theorem CategoryTheory.ExponentiableMorphism.ev_naturality {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X Y : Over I} (g : X ⟶ Y) : CategoryStruct.comp ((ChosenPullbacksAlong.pullback f).map ((pushforward f).map g)) ((ev f).app Y) = CategoryStruct.comp ((ev f).app X) g

theorem CategoryTheory.ExponentiableMorphism.ev_naturality_assoc {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X Y : Over I} (g : X ⟶ Y) {Z : Over I} (h : Y ⟶ Z) : CategoryStruct.comp ((ChosenPullbacksAlong.pullback f).map ((pushforward f).map g)) (CategoryStruct.comp ((ev f).app Y) h) = CategoryStruct.comp ((ev f).app X) (CategoryStruct.comp g h)

theorem CategoryTheory.ExponentiableMorphism.coev_naturality {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X Y : Over J} (g : X ⟶ Y) : CategoryStruct.comp g ((coev f).app Y) = CategoryStruct.comp ((coev f).app X) ((pushforward f).map ((ChosenPullbacksAlong.pullback f).map g))

theorem CategoryTheory.ExponentiableMorphism.coev_naturality_assoc {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X Y : Over J} (g : X ⟶ Y) {Z : Over J} (h : (pushforward f).obj ((ChosenPullbacksAlong.pullback f).obj Y) ⟶ Z) : CategoryStruct.comp g (CategoryStruct.comp ((coev f).app Y) h) = CategoryStruct.comp ((coev f).app X) (CategoryStruct.comp ((pushforward f).map ((ChosenPullbacksAlong.pullback f).map g)) h)

theorem CategoryTheory.ExponentiableMorphism.ev_coev {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] (X : Over J) : CategoryStruct.comp ((ChosenPullbacksAlong.pullback f).map ((coev f).app X)) ((ev f).app ((ChosenPullbacksAlong.pullback f).obj X)) = CategoryStruct.id ((ChosenPullbacksAlong.pullback f).obj X)

The first triangle identity for the counit and unit of the adjunction.

theorem CategoryTheory.ExponentiableMorphism.ev_coev_assoc {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] (X : Over J) {Z : Over I} (h : (ChosenPullbacksAlong.pullback f).obj X ⟶ Z) : CategoryStruct.comp ((ChosenPullbacksAlong.pullback f).map ((coev f).app X)) (CategoryStruct.comp ((ev f).app ((ChosenPullbacksAlong.pullback f).obj X)) h) = h

The first triangle identity for the counit and unit of the adjunction.

theorem CategoryTheory.ExponentiableMorphism.coev_ev {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] (Y : Over I) : CategoryStruct.comp ((coev f).app ((pushforward f).obj Y)) ((pushforward f).map ((ev f).app Y)) = CategoryStruct.id ((pushforward f).obj Y)

The second triangle identity for the counit and unit of the adjunction.

theorem CategoryTheory.ExponentiableMorphism.coev_ev_assoc {C : Type u} [Category.{v, u} C] {I J : C} (f : I ⟶ J) [ChosenPullbacksAlong f] [ExponentiableMorphism f] (Y : Over I) {Z : Over J} (h : (pushforward f).obj Y ⟶ Z) : CategoryStruct.comp ((coev f).app ((pushforward f).obj Y)) (CategoryStruct.comp ((pushforward f).map ((ev f).app Y)) h) = h

The second triangle identity for the counit and unit of the adjunction.

def CategoryTheory.ExponentiableMorphism.pushforwardCurry {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (u : (ChosenPullbacksAlong.pullback f).obj A ⟶ X) : A ⟶ (pushforward f).obj X

The currying of (pullback f).obj A ⟶ X in Over I to a morphism A ⟶ (pushforward f).obj X in Over J.

Equations

• CategoryTheory.ExponentiableMorphism.pushforwardCurry u = ((CategoryTheory.ExponentiableMorphism.pullbackPushforwardAdj f).homEquiv A X) u

def CategoryTheory.ExponentiableMorphism.pushforwardUncurry {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (v : A ⟶ (pushforward f).obj X) : (ChosenPullbacksAlong.pullback f).obj A ⟶ X

The uncurrying of A ⟶ (pushforward f).obj X in Over J to a morphism (Over.pullback f).obj A ⟶ X in Over I.

Equations

• CategoryTheory.ExponentiableMorphism.pushforwardUncurry v = ((CategoryTheory.ExponentiableMorphism.pullbackPushforwardAdj f).homEquiv A X).invFun v

theorem CategoryTheory.ExponentiableMorphism.homEquiv_apply_eq {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (u : (ChosenPullbacksAlong.pullback f).obj A ⟶ X) : ((pullbackPushforwardAdj f).homEquiv A X) u = pushforwardCurry u

theorem CategoryTheory.ExponentiableMorphism.homEquiv_symm_apply_eq {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (v : A ⟶ (pushforward f).obj X) : ((pullbackPushforwardAdj f).homEquiv A X).symm v = pushforwardUncurry v

theorem CategoryTheory.ExponentiableMorphism.pushforward_uncurry_curry {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (u : (ChosenPullbacksAlong.pullback f).obj A ⟶ X) : pushforwardUncurry (pushforwardCurry u) = u

theorem CategoryTheory.ExponentiableMorphism.pushforward_curry_uncurry {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] {X : Over I} {A : Over J} (v : A ⟶ (pushforward f).obj X) : pushforwardCurry (pushforwardUncurry v) = v

instance CategoryTheory.ExponentiableMorphism.instChosenPullbacksAlongHomDiscretePUnitMk {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] : ChosenPullbacksAlong (Over.mk f).hom

Equations

• CategoryTheory.ExponentiableMorphism.instChosenPullbacksAlongHomDiscretePUnitMk = id inferInstance

instance CategoryTheory.ExponentiableMorphism.OverMkHom {C : Type u} [Category.{v, u} C] {I J : C} {f : I ⟶ J} [ChosenPullbacksAlong f] [ExponentiableMorphism f] : ExponentiableMorphism (Over.mk f).hom

Equations

• CategoryTheory.ExponentiableMorphism.OverMkHom = id inferInstance

def CategoryTheory.ExponentiableMorphism.id {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] : ExponentiableMorphism (CategoryStruct.id I)

The identity morphisms 𝟙 _ are exponentiable.

Equations

• One or more equations did not get rendered due to their size.

theorem CategoryTheory.ExponentiableMorphism.id_pushforward {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] : pushforward (CategoryStruct.id I) = Functor.id (Over I)

def CategoryTheory.ExponentiableMorphism.pushforwardId {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] [ExponentiableMorphism (CategoryStruct.id I)] : pushforward (CategoryStruct.id I) ≅ Functor.id (Over I)

Any pushforward of the identity morphism is naturally isomorphic to the identity functor.

Equations

• One or more equations did not get rendered due to their size.

@[simp]

theorem CategoryTheory.ExponentiableMorphism.unit_pushforwardId_hom {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] [ExponentiableMorphism (CategoryStruct.id I)] : CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.id I)).unit ((ChosenPullbacksAlong.pullback (CategoryStruct.id I)).whiskerLeft (pushforwardId I).hom) = (pullbackPushforwardAdj (CategoryStruct.id I)).unit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.unit_pushforwardId_hom_assoc {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] [ExponentiableMorphism (CategoryStruct.id I)] {Z : Functor (Over I) (Over I)} (h : (ChosenPullbacksAlong.pullback (CategoryStruct.id I)).comp (Functor.id (Over I)) ⟶ Z) : CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.id I)).unit (CategoryStruct.comp ((ChosenPullbacksAlong.pullback (CategoryStruct.id I)).whiskerLeft (pushforwardId I).hom) h) = CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.id I)).unit h

@[simp]

theorem CategoryTheory.ExponentiableMorphism.pushforwardId_hom_counit {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] [ExponentiableMorphism (CategoryStruct.id I)] : CategoryStruct.comp (Functor.whiskerRight (pushforwardId I).hom (ChosenPullbacksAlong.pullback (CategoryStruct.id I))) (pullbackPushforwardAdj (CategoryStruct.id I)).counit = (pullbackPushforwardAdj (CategoryStruct.id I)).counit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.pushforwardId_hom_counit_assoc {C : Type u} [Category.{v, u} C] (I : C) [ChosenPullbacksAlong (CategoryStruct.id I)] [ExponentiableMorphism (CategoryStruct.id I)] {Z : Functor (Over I) (Over I)} (h : Functor.id (Over I) ⟶ Z) : CategoryStruct.comp (Functor.whiskerRight (pushforwardId I).hom (ChosenPullbacksAlong.pullback (CategoryStruct.id I))) (CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.id I)).counit h) = CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.id I)).counit h

def CategoryTheory.ExponentiableMorphism.comp {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] : ExponentiableMorphism (CategoryStruct.comp f g)

The composition of exponentiable morphisms is exponentiable.

Equations

• One or more equations did not get rendered due to their size.

theorem CategoryTheory.ExponentiableMorphism.comp_pushforward {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] : pushforward (CategoryStruct.comp f g) = (pushforward f).comp (pushforward g)

def CategoryTheory.ExponentiableMorphism.pushforwardComp {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] [ExponentiableMorphism (CategoryStruct.comp f g)] : pushforward (CategoryStruct.comp f g) ≅ (pushforward f).comp (pushforward g)

The natural isomorphism between pushforward of the composition and the composition of pushforward functors.

Equations

• One or more equations did not get rendered due to their size.

@[simp]

theorem CategoryTheory.ExponentiableMorphism.unit_pushforwardComp_hom {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] [ExponentiableMorphism (CategoryStruct.comp f g)] : CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.comp f g)).unit ((ChosenPullbacksAlong.pullback (CategoryStruct.comp f g)).whiskerLeft (pushforwardComp f g).hom) = (pullbackPushforwardAdj (CategoryStruct.comp f g)).unit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.unit_pushforwardComp_hom_assoc {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] [ExponentiableMorphism (CategoryStruct.comp f g)] {Z : Functor (Over K) (Over K)} (h : (ChosenPullbacksAlong.pullback (CategoryStruct.comp f g)).comp ((pushforward f).comp (pushforward g)) ⟶ Z) : CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.comp f g)).unit (CategoryStruct.comp ((ChosenPullbacksAlong.pullback (CategoryStruct.comp f g)).whiskerLeft (pushforwardComp f g).hom) h) = CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.comp f g)).unit h

@[simp]

theorem CategoryTheory.ExponentiableMorphism.pushforwardComp_hom_counit {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] [ExponentiableMorphism (CategoryStruct.comp f g)] : CategoryStruct.comp (Functor.whiskerRight (pushforwardComp f g).hom (ChosenPullbacksAlong.pullback (CategoryStruct.comp f g))) (pullbackPushforwardAdj (CategoryStruct.comp f g)).counit = (pullbackPushforwardAdj (CategoryStruct.comp f g)).counit

@[simp]

theorem CategoryTheory.ExponentiableMorphism.pushforwardComp_hom_counit_assoc {C : Type u} [Category.{v, u} C] {I J K : C} (f : I ⟶ J) (g : J ⟶ K) [ChosenPullbacksAlong f] [ChosenPullbacksAlong g] [ChosenPullbacksAlong (CategoryStruct.comp f g)] [ExponentiableMorphism f] [ExponentiableMorphism g] [ExponentiableMorphism (CategoryStruct.comp f g)] {Z : Functor (Over I) (Over I)} (h : Functor.id (Over I) ⟶ Z) : CategoryStruct.comp (Functor.whiskerRight (pushforwardComp f g).hom (ChosenPullbacksAlong.pullback (CategoryStruct.comp f g))) (CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.comp f g)).counit h) = CategoryStruct.comp (pullbackPushforwardAdj (CategoryStruct.comp f g)).counit h