The monotone-light factorization for 2-categories via 2-prorders
Category Theory
2023-05-16 v3
Abstract
It is shown that the reflection 2Cat --> 2Preord of the category of all 2-categories into the category of 2-preorders determines a monotone-light factorization system on 2Cat and that the light morphisms are precisely the 2-functors faithful on 2-cells with respect to the vertical structure. In order to achieve such result it was also proved that the reflection 2Cat --> 2Preord has stable units, a stronger condition than admissibility in categorical Galois theory, and that 2-functors surjective both on horizontally composable triples of vertically composable pairs and on vertically composable triples of horizontally composable pairs of 2-cells are effective descent morphisms in 2Cat.
Cite
@article{arxiv.2202.06394,
title = {The monotone-light factorization for 2-categories via 2-prorders},
author = {João J. Xarez},
journal= {arXiv preprint arXiv:2202.06394},
year = {2023}
}