Any small complete category is a preorder

We show that any small category which has all (small) limits is a preorder: In particular, we show that if a small category C in universe u has products of size u, then for any X Y : C there is at most one morphism X ⟶ Y. Note that in Lean, a preorder category is strictly one where the morphisms are in Prop, so we instead show that the homsets are subsingleton.

References

• https://ncatlab.org/nlab/show/complete+small+category#in_classical_logic

Tags

small complete, preorder, Freyd

@[instance 100]

instance CategoryTheory.instIsThin {C : Type u} [CategoryTheory.SmallCategory C] [CategoryTheory.Limits.HasProducts C] : Quiver.IsThin C

A small category with products is a thin category.

in Lean, a preorder category is one where the morphisms are in Prop, which is weaker than the usual notion of a preorder/thin category which says that each homset is subsingleton; we show the latter rather than providing a Preorder C instance.

Equations

• ⋯ = ⋯