$(\infty,2)$-Topoi and descent
Abstract
We set the foundations of a theory of Grothendieck -topoi based on the notion of fibrational descent, which axiomatizes both the existence of a classifying object for fibrations internal to an -category as well as the exponentiability of these fibrations. As our main result, we prove a 2-dimensional version of Giraud's theorem which characterizes -topoi as those -categories that appear as localizations of -valued presheaves in which the localization functor preserves certain partially lax finite limits which we call oriented pullbacks. We develop the basics of a theory of partially lax Kan extensions internal to an -topos, and we show that every -topos admits an internal version of the Yoneda embedding. Our general formalism recovers the theory of categories internal to a -topos (as develop by the second author and Sebastian Wolf) as a full sub--category of the -category of -topoi. As a technical ingredient, we prove general results on the theory of presentable -categories, including lax cocompletions and 2-dimensional versions of the adjoint functor theorem, which might be of independent interest.
Cite
@article{arxiv.2410.02014,
title = {$(\infty,2)$-Topoi and descent},
author = {Fernando Abellán and Louis Martini},
journal= {arXiv preprint arXiv:2410.02014},
year = {2024}
}
Comments
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