English

A theory of 2-pro-objects (with expanded proofs)

Category Theory 2014-06-24 v1

Abstract

Grothendieck develops the theory of pro-objects over a category C\mathsf{C}. The fundamental property of the category Pro(C)\mathsf{Pro}(\mathsf{C}) is that there is an embedding CcPro(C)\mathsf{C} \overset{c}{\longrightarrow} \mathsf{Pro}(\mathsf{C}), the category Pro(C)\mathsf{Pro}(\mathsf{C}) is closed under small cofiltered limits, and these limits are free in the sense that for any category E\mathsf{E} closed under small cofiltered limits, pre-composition with cc determines an equivalence of categories Cat(Pro(C),E)+Cat(C,E)\mathcal{C}at(\mathsf{Pro}(\mathsf{C}),\,\mathsf{E})_+ \simeq \mathcal{C}at(\mathsf{C},\, \mathsf{E}), (where the "++" indicates the full subcategory of the functors preserving cofiltered limits). In this paper we develop a 2-dimensional theory of pro-objects. Given a 2-category C\mathcal{C}, we define the 2-category 2-Pro(C)2\hbox{-}\mathcal{P}ro(\mathcal{C}) whose objects we call 2-pro-objects. We prove that 2-Pro(C)2\hbox{-}\mathcal{P}ro(\mathcal{C}) has all the expected basic properties adequately relativized to the 2-categorical setting, including the universal property corresponding to the one described above. We have at hand the results of Cat\mathcal{C}at-enriched category theory, but our theory goes beyond the Cat\mathcal{C}at-enriched case since we consider the non strict notion of pseudo-limit, which is usually that of practical interest.

Keywords

Cite

@article{arxiv.1406.5762,
  title  = {A theory of 2-pro-objects (with expanded proofs)},
  author = {M. Emilia Descotte and Eduardo J. Dubuc},
  journal= {arXiv preprint arXiv:1406.5762},
  year   = {2014}
}

Comments

This is a version of the article "A theory of 2-Pro-objects, Cahiers de topologie et g\'eom\'etrie diff\'erentielle cat\'egoriques, Vol LV, 2014", in which we have added more details in several proofs, and utilized the elevators calculus graphical notation

R2 v1 2026-06-22T04:44:24.089Z