Epireflective subcategories and formal closure operators

Abstract: On a category C with a designated (well-behaved) class M of monomorphisms, a closure operator in the sense of D. Dikranjan and E. Giuli is a pointed endofunctor of M, seen as a full subcategory of the arrow-category C 2 whose objects are morphisms from the class M, which "commutes" with the codomain functor cod : M → C . In other words, a closure operator consists of a functor C : M → M and a natural transformation c : 1 M → C such that cod•C = C and cod•c = 1 cod . In this paper we adapt this notion to the do… Show more