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