algebra.category.constructions ============================== Common categories and constructions on categories. The following files are in this folder. * [functor](functor.hlean) : Functor category * [opposite](opposite.hlean) : Opposite category * [hset](hset.hlean) : Category of sets. Includes proof that it is complete and cocomplete * [sum](sum.hlean) : Sum category * [product](product.hlean) : Product category * [comma](comma.hlean) : Comma category * [cone](cone.hlean) : Cone category Discrete, indiscrete or finite categories: * [finite_cats](finite_cats.hlean) : Some finite categories, which are diagrams of common limits (the diagram for the pullback or the equalizer). Also contains a general construction of categories where you give some generators for the morphisms, with the condition that you cannot compose two of thosex * [discrete](discrete.hlean) * [indiscrete](indiscrete.hlean) * [terminal](terminal.hlean) * [initial](initial.hlean) Non-basic topics: * [functor2](functor2.hlean) : showing that the functor category has (co)limits if the codomain has them.