Relative monadicity
Abstract
We establish a relative monadicity theorem for relative monads with dense roots in a virtual equipment, specialising to a relative monadicity theorem for enriched relative monads. In particular, for a dense -functor , a -functor is -monadic if and only if admits a left -relative adjoint and creates -absolute colimits. This provides a refinement of the classical monadicity theorem -- characterising those categories whose objects are given by those of equipped with algebraic structure -- in which the arities of the algebraic operations are valued in . In particular, when , we recover a formal monadicity theorem. Furthermore, we examine the interaction between the pasting law for relative adjunctions and relative monadicity. As a consequence, we derive necessary and sufficient conditions for the (-relative) monadicity of the composite of a -functor with a (-relatively) monadic -functor.
Cite
@article{arxiv.2305.10405,
title = {Relative monadicity},
author = {Nathanael Arkor and Dylan McDermott},
journal= {arXiv preprint arXiv:2305.10405},
year = {2024}
}
Comments
25 pages; v3: improved exposition; final journal version