Sigma limits in 2-categories and flat pseudofunctors
Abstract
In this paper we introduce sigma limits (which we write -limits), a concept that interpolates between lax and pseudolimits: for a fixed family of arrows of a 2-category , a -cone for a -functor is a lax cone such that the structural 2-cells corresponding to the arrows of are invertible. The conical -limit of is the universal -cone. Similary we define -natural transformations and weighted -limits. We consider also the case of bilimits. We develop the theory of -limits and -bilimits, whose importance relies on the following key fact: any weighted -limit (or -bilimit) can be expressed as a conical one. From this we obtain, in particular, a canonical expression of an arbitrary -valued 2-functor as a conical -bicolimit of representable 2-functors, for a suitable choice of , which is equivalent to the well known bicoend formula. As an application, we establish the 2-dimensional theory of flat pseudofunctors. We define a -valued pseudofunctor to be flat when its left bi-Kan extension along the Yoneda 2-functor preserves finite weighted bilimits. We introduce a notion of 2-filteredness of a 2-category with respect to a class , which we call -filtered. Our main result is: A pseudofunctor is flat if and only if it is a -filtered -bicolimit of representable 2-functors. In particular the reader will notice the relevance of this result for the development of a theory of 2-topoi.
Cite
@article{arxiv.1610.09429,
title = {Sigma limits in 2-categories and flat pseudofunctors},
author = {M. E. Descotte and E. J. Dubuc and M. Szyld},
journal= {arXiv preprint arXiv:1610.09429},
year = {2018}
}
Comments
40 pages, final version to appear in Advances in Mathematics