English

Comonadic base change for enriched categories

Category Theory 2021-12-10 v2

Abstract

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

Keywords

Cite

@article{arxiv.1809.02356,
  title  = {Comonadic base change for enriched categories},
  author = {Branko Nikolić and Ross Street},
  journal= {arXiv preprint arXiv:1809.02356},
  year   = {2021}
}

Comments

29 pages. The paper is totally restructured and includes more examples

R2 v1 2026-06-23T03:57:40.769Z