Cosheafification

Abstract

It is proved that for any Grothendieck site X, there exists a coreflection (called cosheafification) from the category of precosheaves on X with values in a category K, to the full subcategory of cosheaves, provided either K or Kop is locally presentable. If K is cocomplete, such a coreflection is built explicitly for the (pre)cosheaves with values in the category Pro% ( K) of pro-objects in K. In the case of precosheaves on topological spaces, it is proved that any precosheaf with values in Pro( K) is smooth, i.e. is strongly locally isomorphic to a cosheaf. Constant cosheaves are constructed, and there are established connections with shape theory.