The Enriched Grothendieck Construction
Category Theory
2019-09-10 v4
Abstract
We define and study opfibrations of -enriched categories when is an extensive monoidal category whose unit is terminal and connected. This includes sets, simplicial sets, categories, or any locally cartesian closed category with disjoint coproducts and connected unit. We show that for an ordinary category , there is an equivalence of 2-categories between -enriched opfibrations over the free -category on , and pseudofunctors from to the 2-category of -categories. This generalizes the classical (-enriched) Grothendieck correspondence.
Cite
@article{arxiv.1804.03829,
title = {The Enriched Grothendieck Construction},
author = {Jonathan Beardsley and Liang Ze Wong},
journal= {arXiv preprint arXiv:1804.03829},
year = {2019}
}
Comments
Final version to appear in Advances in Mathematics, minor changes after further refereeing, 30 pages