Discrete-underlying adjunction

Given a category C with sheafification with respect to the coherent topology on light profinite sets, we define a functor C ⥤ LightCondensed C which associates to an object of C the corresponding "discrete" light condensed object (see LightCondensed.discrete).

In LightCondensed.discreteUnderlyingAdj we prove that this functor is left adjoint to the forgetful functor from Condensed C to C.

@[simp]

theorem LightCondensed.discrete_map (C : Type w) [CategoryTheory.Category.{u, w} C] [CategoryTheory.HasSheafify (CategoryTheory.coherentTopology LightProfinite) C] : ∀ {X Y : C} (f : X ⟶ Y), (LightCondensed.discrete C).map f = (CategoryTheory.presheafToSheaf (CategoryTheory.coherentTopology LightProfinite) C).map ((CategoryTheory.Functor.const LightProfiniteᵒᵖ).map f)

@[simp]

theorem LightCondensed.discrete_obj (C : Type w) [CategoryTheory.Category.{u, w} C] [CategoryTheory.HasSheafify (CategoryTheory.coherentTopology LightProfinite) C] (X : C) : (LightCondensed.discrete C).obj X = (CategoryTheory.presheafToSheaf (CategoryTheory.coherentTopology LightProfinite) C).obj ((CategoryTheory.Functor.const LightProfiniteᵒᵖ).obj X)

noncomputable def LightCondensed.discrete (C : Type w) [CategoryTheory.Category.{u, w} C] [CategoryTheory.HasSheafify (CategoryTheory.coherentTopology LightProfinite) C] : CategoryTheory.Functor C (LightCondensed C)

The discrete condensed object associated to an object of C is the constant sheaf at that object.

Equations

• LightCondensed.discrete C = CategoryTheory.constantSheaf (CategoryTheory.coherentTopology LightProfinite) C

@[simp]

theorem LightCondensed.underlying_obj (C : Type w) [CategoryTheory.Category.{u, w} C] (j : CategoryTheory.Sheaf (CategoryTheory.coherentTopology LightProfinite) C) : (LightCondensed.underlying C).obj j = j.val.obj { unop := LightProfinite.of PUnit.{u + 1} }

@[simp]

theorem LightCondensed.underlying_map (C : Type w) [CategoryTheory.Category.{u, w} C] : ∀ {X Y : CategoryTheory.Sheaf (CategoryTheory.coherentTopology LightProfinite) C} (f : X ⟶ Y), (LightCondensed.underlying C).map f = f.val.app { unop := LightProfinite.of PUnit.{u + 1} }

noncomputable def LightCondensed.underlying (C : Type w) [CategoryTheory.Category.{u, w} C] : CategoryTheory.Functor (LightCondensed C) C

The underlying object of a condensed object in C is the condensed object evaluated at a point. This can be viewed as a sort of forgetful functor from Condensed C to C

Equations

• LightCondensed.underlying C = (CategoryTheory.sheafSections (CategoryTheory.coherentTopology LightProfinite) C).obj { unop := LightProfinite.of PUnit.{u + 1} }

noncomputable def LightCondensed.discreteUnderlyingAdj (C : Type w) [CategoryTheory.Category.{u, w} C] [CategoryTheory.HasSheafify (CategoryTheory.coherentTopology LightProfinite) C] : LightCondensed.discrete C ⊣ LightCondensed.underlying C

Discreteness is left adjoint to the forgetful functor. When C is Type*, this is analogous to TopCat.adj₁ : TopCat.discrete ⊣ forget TopCat.  

Equations

• LightCondensed.discreteUnderlyingAdj C = CategoryTheory.constantSheafAdj (CategoryTheory.coherentTopology LightProfinite) C LightProfinite.isTerminalPUnit

@[reducible, inline]

noncomputable abbrev LightCondSet.discrete : CategoryTheory.Functor (Type u) (LightCondensed (Type u))

A version of LightCondensed.discrete in the LightCondSet namespace

Equations

• LightCondSet.discrete = LightCondensed.discrete (Type u)

@[reducible, inline]

noncomputable abbrev LightCondSet.underlying : CategoryTheory.Functor (LightCondensed (Type u)) (Type u)

A version of LightCondensed.underlying in the LightCondSet namespace

Equations

• LightCondSet.underlying = LightCondensed.underlying (Type u)

@[reducible, inline]

noncomputable abbrev LightCondSet.discreteUnderlyingAdj : LightCondSet.discrete ⊣ LightCondSet.underlying

A version of LightCondensed.discrete_underlying_adj in the LightCondSet namespace

Equations

• LightCondSet.discreteUnderlyingAdj = LightCondensed.discreteUnderlyingAdj Type