Comonadic base change for enriched categories

Abstract

For our concepts of change of base and comonadicity, we work in the general context of the tricategory Caten whose objects are bicategories V and whose morphisms are categories enriched on two sides. For example, for any monoidal comonad G on a cocomplete closed monoidal category C, the forgetful functor U : CG C is comonadic when regarded as a morphism in Caten between one-object bicategories. We show that the forgetful pseudofunctor U:VG→ V from the bicategory of Eilenberg-Moore coalgebras for a comonad G on V in Caten induces a change of base pseudofunctor U:VG-Mod→ V-Mod which is comonadic in a bigger version of Caten. We define Hopfness for such a comonad G and prove that having that property implies U creates left (Kan) extensions in the bicategory VG. We provide conditions under which Hopfness carries over from G to the comonad G=U R generated by the adjunction U R. This has implications for characterizing the absolute colimit completion of VG-categories.